The Paradox of Intelligibility: Formal Systems, Transcendental Conditions, and the Logos

I. The Paradox of Conditions

Transcendental arguments occupy an uneasy place in contemporary philosophy. On the one hand, they seem unavoidable, for any serious account of knowledge, experience, or formal reasoning must, at some point, ask after the conditions under which such activities are possible at all. On the other hand, transcendental reasoning seems perpetually threatened by a familiar worry: how can one speak meaningfully about conditions of possibility without already presupposing what one claims to ground?

This worry is not merely rhetorical. It has a precise logical form. If the conditions of intelligibility are themselves intelligible only under further conditions, then a regress threatens: each appeal to grounding demands a higher-order ground. If, by contrast, the conditions are simply posited or declared self-evident, then the argument collapses into dogmatism. Either the transcendental recedes indefinitely, or it hardens into an unexplained given.

This dilemma was famously articulated by Schopenhauer in his criticism of the cosmological argument. He observed that the principle of sufficient reason is employed to generate an explanatory regress, only to be dismissed “like a hired cab” once it has carried the argument as far as it can go. The demand for explanation is invoked universally, and then silently suspended at the point where explanation becomes most difficult. Schopenhauer was right to regard such a maneuver as illicit. But his critique also reveals a deeper assumption shared by both the argument he rejects and the dilemma he exposes: namely, that any legitimate condition must itself be conditioned in the same way. Once this assumption is questioned, the apparent necessity of choosing between infinite regress and dogmatic arrest loses its force.

Much of modern philosophy can be read as an attempt to navigate between the horns of an infinite regress and the unexplained given. Empiricism resists transcendental claims by restricting legitimate inquiry to what is given, yet in doing so tacitly relies on norms of relevance, justification, and inference that are not themselves given. Rationalism seeks secure foundations, but risks mistaking formal consistency or conceptual clarity for sufficiency. Even deflationary approaches that aim to dissolve transcendental questions often do so by quietly presupposing the very intelligibility they decline to explain.

What complicates the matter further is the role of formal systems. Logic and mathematics seem, at first glance, to offer a way out. If the rules of inference, proof, and formalization can be made explicit, perhaps the conditions of intelligibility can be fully internalized within a system. On this view, what philosophy struggles to articulate, formal rigor might finally secure.

Yet the history of formal thought undermines this hope. The more powerful and expressive a formal system becomes, the more clearly it exhibits a distinction it cannot abolish: the distinction between what is derivable within the system and what counts as the system’s being correctly understood, applied, or taken as adequate. No formal calculus contains, as a theorem, the fact that it is the right calculus for the domain it is used to model. That recognition occurs, if at all, at a level not captured by the system’s own rules.

This is not a contingent limitation due to human finitude, nor merely a practical inconvenience. It is a structural feature of intelligibility. Any determination of rules, axioms, or inferential norms presupposes a prior space in which those determinations can be recognized as relevant, coherent, or successful. The question of conditions therefore cannot be eliminated by formalization; it is sharpened by it.

The paradox of transcendental inquiry can now be stated more precisely. The conditions of intelligibility cannot be objects within the same register as what they condition without ceasing to function as conditions. Yet they cannot be nothing, or merely subjective, without rendering intelligibility inexplicable. They must be real without being determinate in the same way that determined objects are real. They must ground without appearing as grounded.

The task, then, is not to escape this paradox, but to understand its structure. Only by doing so can we make sense of how intelligibility is possible at all—and why any attempt to fully objectify its conditions inevitably leaves something essential behind. 

II. Formal Systems and the Excess of Meaning

Formal systems appear, at first glance, to offer the clearest counterexample to the paradox of intelligibility. In logic and mathematics, rules are explicit, symbols are well-defined, and validity is determined by purely formal criteria. If intelligibility could be fully internalized anywhere, it would seem to be here. The meaning of a proof, on this view, is exhausted by its derivability from axioms according to specified rules.

Yet it is precisely within this domain of maximal rigor that the paradox reasserts itself with greatest force. The twentieth century’s foundational results did not merely reveal technical limitations; they exposed a structural feature of formal intelligibility itself. A sufficiently expressive formal system can represent statements about its own syntax and derivations, but it cannot, on pain of inconsistency or incompleteness, secure from within the distinction between what is provable and what is true.

The significance of this result is often misunderstood. It is not simply that there exist true statements that cannot be proven within a given system. More importantly, the recognition of such statements as true is not itself a formal achievement of the system in question. Even when meta-mathematical claims are themselves formalized in stronger systems, the judgment that such formalizations are adequate, faithful, or relevant is not thereby captured. The meta-level recedes as it is formalized. What is gained in expressive power is accompanied by a renewed excess.

This excess is not accidental. A formal system, considered purely as a set of symbols and transformation rules, is indifferent to its own application. It does not determine the domain it is meant to model, nor does it certify that it is the appropriate system for that domain. Those determinations require judgments of interpretation, relevance, and adequacy—judgments that are not reducible to formal derivation without presupposing precisely what is at issue.

To recognize a formal system as a system—rather than as an uninterpreted calculus—is already to stand outside it in a space of intelligibility that the system itself does not generate. This space is not an optional supplement added by human users; it is a condition of the possibility of formalization as such. Without it, there would be no fact of the matter as to whether a symbol counts as a formula, a derivation as a proof, or a model as appropriate.

Attempts to eliminate this excess by further formalization merely reproduce the structure at a higher level. A meta-system may codify inference rules about object-level proofs, but the recognition that the meta-system is doing so correctly again depends on criteria not contained within its formal syntax. The hierarchy does not terminate in a final, self-validating system. What persists is the need for a horizon within which formal relations can be taken as meaningful at all.

This horizon is often described, misleadingly, as external or informal. But this characterization obscures its status. It is not external in the sense of being arbitrary, subjective, or contingent. Nor is it informal in the sense of being vague or merely intuitive. Rather, it is pre-formal: the condition under which form can be recognized as form, and rule-governed activity as rule-governed.

Formal systems therefore do not abolish the question of intelligibility; they intensify it. By displaying, with maximal clarity, the distinction between derivation and meaning, they reveal that intelligibility is not itself a formal property. It is that by virtue of which formal properties can matter at all.

The lesson is not anti-formal. On the contrary, it is only through formal rigor that this structure becomes visible. Logic teaches, by its own internal limits, that intelligibility cannot be fully objectified without remainder. That remainder is not a defect in the system. It is the condition that allows the system to appear as intelligible in the first place.

III. Determinability and the Indeterminate

The preceding analysis suggests that intelligibility is not exhausted by any set of determinate forms. Formal systems, inferential norms, and conceptual frameworks all presuppose a space in which they can be taken as meaningful, adequate, or appropriate. The question now is how to characterize this space without collapsing it into another determination, thereby repeating the very problem it is meant to address.

A crucial distinction must therefore be introduced: the distinction between determination and determinability. Determination concerns what is fixed, articulated, and rule-governed. Determinability concerns the capacity for such fixing to occur at all. While determinations are many, revisable, and domain-specific, determinability is singular in structure: it is the condition under which anything can count as a determination.

This distinction allows us to clarify the status of the “excess” encountered in formal systems. What exceeds formal determination is not a further, as-yet-undiscovered form, nor an incomplete specification waiting to be filled in. It is not an indeterminate object standing alongside determinate ones. Rather, it is the indeterminate field that makes determination possible without itself being determinable in the same way.

The indeterminate, in this sense, should not be confused with the vague, the arbitrary, or the merely subjective. Vagueness is a deficiency of determination; arbitrariness is a failure of constraint. The indeterminate at issue here is neither. It is structured precisely as openness to form. It does not issue determinate rules, but it orients determination by making relevance, coherence, and success intelligible as norms in the first place.

This structure becomes visible whenever attempts are made to formalize the process of revision, interpretation, or theory change. To specify rules for revising a system presupposes judgments about what counts as an improvement, a correction, or a deeper explanation. Those judgments cannot be exhaustively encoded without already assuming a background sense of what the system is for. The purpose that guides revision is not itself derivable from the system under revision.

Here again, regress threatens if one misunderstands the situation. One might attempt to introduce higher-order rules governing relevance or adequacy. But these, too, would require criteria for their correct application. The ladder of determination cannot be retained within the structure it enables. What halts the regress is not a final rule, but the recognition that determinability itself is not something to be determined.

The indeterminate, therefore, is not opposed to form. It is what allows form to arise without necessity. It constrains without dictating. It orders without specifying. In this sense, it is teleological without being mechanical: it orients determinations toward intelligibility without prescribing in advance what form that intelligibility must take.

This orientation is real. It is not projected by individual subjects, nor reducible to social convention, though it is encountered only through determinate practices. Nor is it an abstract metaphysical substrate. It is encountered wherever sense is made, reasons are given, or understanding is achieved. It is what allows a determination to count as about something rather than merely occurring.

We are thus led to a striking conclusion. Intelligibility depends on something that cannot itself be fully rendered intelligible in determinate terms without undermining its role. The condition for the possibility of determination is an indeterminate that does not compete with determinate structures, but sustains them. This is not a failure of theory. It is the structural signature of intelligibility itself.

The task now is to show that this structure is not an ad hoc invention, but has already been articulated—albeit under a different name—within the critical tradition. To do so, we must turn to the distinction between determining and reflecting judgment.

IV. Reflective Judgment and the Teleological Space of Intelligibility

The structure of intelligibility that has emerged thus far—an indeterminate orientation that makes determinate form possible without prescribing it—finds its most precise articulation in Kant’s distinction between determining and reflecting judgment. This distinction does not introduce a new metaphysical posit. Rather, it renders explicit a condition already at work wherever intelligibility is achieved.

Determining judgment operates by subsuming particulars under given universals. Where the rule is known in advance, application consists in identifying what falls under it. This is the paradigm case for formal systems: axioms are fixed, rules are explicit, and correctness is a matter of conformity. Determining judgment is indispensable wherever rigorous articulation is required.

Reflecting judgment, by contrast, operates under fundamentally different conditions. Here, the universal is not given in advance. One is confronted with particulars that demand unification, coherence, or sense, but without a determinate rule that dictates how this is to be achieved. The task of reflecting judgment is not to apply a rule, but to seek one—to orient inquiry toward intelligibility without knowing in advance what form that intelligibility will take.

This distinction is often misunderstood as merely epistemic or psychological, as though a reflecting judgment were a subjective heuristic supplementing genuine cognition. But this misreads its function. A reflecting judgment is not a matter of personal preference or aesthetic whim. It is the condition under which determinate judgments can be coordinated, revised, and meaningfully related to one another at all.

When multiple object domains, formal systems, or explanatory frameworks must be brought into relation, no higher-order determining rule can be presupposed without begging the question. The very act of coordination requires judgments of relevance, adequacy, and purposiveness that are not derivable from the systems being coordinated. Reflecting judgment names this irreducible function.

Kant characterizes reflecting judgment as teleological: it proceeds as if nature were ordered toward intelligibility. This “as if” is crucial. It does not assert that the order of nature is the product of an external designer, nor does it reduce purposiveness to subjective projection. Rather, it marks the structural necessity of orientation toward coherence in the absence of determinate rules. Teleology here is not a doctrine about ends, but a condition for the possibility of sense-making.

This teleological space is precisely what was earlier identified as determinability. It is the indeterminate orientation that allows determinate forms to be sought, evaluated, and revised without collapsing inquiry into arbitrariness or regress. Reflecting judgments do not generate determinate content, but they govern the movement by which determinate content becomes intelligible as content.

Crucially, this space cannot itself be formalized without distortion. To attempt to encode the rules of reflecting judgment would be to transform it into determining judgment, thereby presupposing the very orientation it is meant to explain. Reflecting judgments operate only where algorithmic closure is unavailable in principle. Their necessity is therefore structural, not provisional.

The structure at issue here bears a recognizable affinity to what has been described, within transcendental Thomism, as a pre-apprehension or anticipatory openness to being. But the affinity is limited and must not be overstated. Accounts that locate the horizon of intelligibility within the transcendental structure of the knowing subject, however refined, risk relocating an ontological condition into an epistemic register. The teleological space described here is not the result of any pre-grasp, implicit or explicit, on the part of a subject. It is the condition under which any grasp can count as intelligible at all. Subjects do not constitute this space, nor do they disclose it as its origin. They find themselves always already addressed by it.

Seen in this light, Kant’s Third Critique is not an appendix to critical philosophy, but its completion. Without reflecting judgments, the unity of reason fragments into isolated domains of determination with no principled way of relating them. With it, intelligibility is secured not by a final system, but by a regulated openness to form.

We are now in a position to draw a decisive conclusion. Intelligibility requires a real, irreducible, non-formal order that orients determinate structures toward meaning without determining their content. Philosophy can describe this order, and critique can delimit its function, but neither can generate it from within formal or empirical constraints. To name this order is not yet to explain it—but it is to acknowledge that intelligibility is grounded more deeply than any system can contain.

It is at this point that the question of Logos can no longer be deferred.

V. Logos and the Ground of Intelligibility

The preceding analysis has led, step by step, to a structure that philosophy cannot evade without loss. Intelligibility depends on a real, non-formal order that orients determinate structures toward meaning without itself being reducible to determination. This order is not an object among objects, nor a rule among rules, nor a projection of subjective preference. It grounds without being grounded in the same register. The question now is how such an order can be named without being misconstrued.

It is here that the concept of the Logos re-emerges with philosophical necessity rather than theological imposition. The Logos does not first designate a spoken word, a proposition, or a system of concepts. It names that by virtue of which articulation is possible at all. The Logos is the condition under which meaning can appear, without exhausting itself in any particular meaning that appears.

To invoke the Logos in this sense is not to posit a highest object or an explanatory mechanism. It is to acknowledge that intelligibility itself has a ground that is neither formal nor empirical, neither subjective nor arbitrary. The Logos is not a further determination added to the series of determinations; it is the order that allows determinations to count as meaningful rather than merely occurring.

This clarifies why the Logos cannot be captured within a system without contradiction. Any attempt to formalize the Logos would already presuppose the intelligibility it is meant to explain. The Logos is not what is said, but that by virtue of which anything can be said. It is not the content of meaning, but the source of its possibility. In this respect, the Logos stands in the same structural position as the indeterminate determinability earlier identified: real, irreducible, and non-competitive with determinate forms.

Philosophy can describe this structure and delimit its necessity, but it cannot generate it from within its own methods. While critique can show that intelligibility requires such a ground, it cannot provide the ground itself as an object of determination. This is not a failure of philosophy, but its fulfillment. Reason reaches its limit not in incoherence, but in recognition.

It is at this point that philosophical theology becomes unavoidable—not as a replacement for critique, but as its continuation under a different mode of discourse. Theology does not enter by adding new explanatory content, but by naming what philosophy has already uncovered but cannot finally articulate. The term Logos functions here not as dogma, but as a concept disciplined by metaphysical necessity.

The claim that “in the beginning was the Logos” is therefore not temporal, nor mythological. It is ontological. It affirms that intelligibility is not self-originating, that meaning is not an emergent accident of formal complexity, and that the space in which anything can be understood is itself grounded. Formal systems, scientific theories, languages, and even our most advanced machines do not create this space. They inhabit it. They respond to it.

This response is not compelled. Logos orders without coercion. It grants intelligibility without dictating form. It sustains the finite without abolishing finitude. Determinate structures are neither absorbed into an indeterminate abyss nor left to arbitrariness. They are upheld as meaningful precisely because the ground of meaning does not compete with what it grounds.

From this perspective, the theological claim that the Logos enters history does not negate metaphysical rigor, but radicalizes it. If intelligibility is grounded, then it is not indifferent to the forms it sustains. The Word does not remain aloof from determination, nor does determination exhaust the Word. Meaning can be borne by what does not generate it from itself.

This is not sentiment, metaphor, or consolation. It is a metaphysical consequence of taking intelligibility seriously. Logic itself teaches that meaning cannot be fully objectified without remainder. That remainder is not an embarrassment to be eliminated, but the sign that intelligibility is grounded more deeply than any system can contain.

The paradox of intelligibility is therefore not resolved by closure, but by acknowledgment. Meaning is possible because it is given before it is grasped, ordered before it is determined, and grounded before it is known. To name this ground is not to end inquiry, but to recognize the condition under which inquiry is possible at all.

Postscript: Theory Change and the Limits of Algorithmic Rationality

The structure described in this essay is not confined to abstract metaphysics. It becomes visible with particular clarity in cases of theory change in the sciences. Scientific rationality is often described as rule-governed, cumulative, and corrigible. Yet moments of genuine theoretical transition resist full algorithmic reconstruction.

Consider the adoption of a successor theory in a mature science—one that is not merely an extension of its predecessor, but reorganizes its explanatory framework. Such transitions are not governed by determinate rules that necessitate the abandonment of one theory and the adoption of another. No finite set of criteria—empirical adequacy, simplicity, scope, coherence—functions as a decision procedure whose satisfaction compels assent. Each criterion admits of interpretation, weighting, and trade-off, and no algorithm determines their relative authority in advance.

This does not mean that theory change is arbitrary, irrational, or merely sociological. On the contrary, it is often experienced by practitioners as compelling. But the form of this compulsion is not logical necessity. It arises from a judgment that a new framework makes better sense of the domain as a whole—by unifying phenomena, resolving tensions, or opening new paths of inquiry—without being derivable from the prior framework’s rules of assessment.

Such judgments are paradigmatic instances of reflecting judgment. They operate within an open space of intelligibility in which theories are oriented toward meaning, coherence, and explanatory power without being selected by necessity. Competing theories may coexist within this space, each intelligible, each defensible, yet not equally compelling. The eventual adoption of one over another is lured by intelligibility rather than forced by rule.

What makes this possible is not a hidden algorithm awaiting discovery, but the very structure this essay has traced: an indeterminate, teleological orientation that allows determinate frameworks to be evaluated as frameworks at all. The rationality of theory change depends on this space, but cannot reduce it to formal criteria without loss.

Scientific reason, at its most rigorous moments, thus bears witness to the same paradox that governs intelligibility as such. Its progress presupposes an order that guides without dictating, that attracts without necessitating, and that grounds rational judgment without itself becoming an object of determination.

Appendix: Why This Is Not a Hegelian Account

Because the argument of this essay proceeds at the level of intelligibility as such, it may invite comparison with Hegelian accounts of reason, meaning, and their relation to reality. That comparison is understandable. It is also misleading. The present position differs from Hegel’s at precisely those points that are decisive for the structure of the argument.

First, the account offered here does not operate by dialectical sublation. Hegelian intelligibility advances through contradiction, negation, and Aufhebung, such that earlier moments are aufgehoben—both preserved and overcome—in progressively more adequate conceptual determinations. By contrast, the indeterminacy identified in this essay is not a provisional lack awaiting conceptual resolution. It is an irreducible condition of intelligibility itself. Teleological orientation does not culminate in synthesis or closure, but remains operative precisely insofar as no final determination is possible in principle.

Second, this account explicitly denies the identity of thought and being. For Hegel, the rational is ultimately identical with the real, and intelligibility achieves its fulfillment in the complete articulation of this identity. Here, intelligibility grounds thought without being exhausted by it. Thought responds to intelligibility; it does not complete or actualize it. The possibility of meaning is more fundamental than any conceptual system that articulates meaning.

Third, the teleology at issue is non-necessitating. Hegelian development is governed by logical necessity: given one moment, the next must follow. The teleological spaces described here, by contrast, orient without compelling. They lure without necessitating. They allow for plural, non-equivalent determinations without implying that history, theory, or thought is driven toward a single, comprehensive resolution.

Fourth, subjectivity is not the site of reconciliation. Although Hegel’s system ultimately situates the realization of intelligibility within the self-unfolding of spirit—whether subjective, objective, or absolute—the present account resists any subject-centered grounding. The conditions of intelligibility are ontological rather than anthropological. Subjects participate in intelligibility, but they neither generate nor consummate it.

Finally, and most decisively, this account affirms a permanent remainder. Intelligibility cannot be fully objectified, formalized, or systematized without loss. This remainder is not a defect to be eliminated by further conceptual development, but the very condition under which meaning, judgment, and rational progress remain possible. Any account that denies this remainder in principle, or treats it as destined for eventual absorption into a complete system, differs fundamentally from the position defended here.

For these reasons, while the present argument shares with Hegel a refusal of superficial empiricism and an insistence on first-principles rigor, it rejects the core commitments that define a Hegelian metaphysics. Intelligibility does not achieve closure in system, history, or spirit. It grounds without being aufgehoben.

One may go further. The teleological space of intelligibility described in this essay is not merely compatible with the formulation of a Hegelian system; it is a necessary condition for its possibility. The articulation of any comprehensive dialectical system presupposes a prior horizon within which conceptual development can count as intelligible, progressive, and relevant rather than merely successive. That horizon cannot itself be the product of dialectical closure without circularity. The present account therefore does not reject Hegelian system-building from the outside; it situates it within a more fundamental structure of intelligibility that no system—Hegel’s included—can finally exhaust.

Disputatio XXIIIa: De Sermone Meta-Theoretico et Intelligibilitate Formali

 On Meta-Theoretical Discourse and Formal Intelligibility

Why an Intermezzo?

This disputation is designated an Intermezzo because it does not advance a new doctrinal locus but clarifies the conditions under which all doctrinal discourse is intelligible. It marks a structural pause in the argument, making explicit what has thus far been presupposed: the irreducible horizon of intelligibility within which formal, scientific, philosophical, and theological speech can occur. By naming this horizon, the Intermezzo secures the transition from questions of meaning and participation to questions of order and law.

Quaeritur

Utrum intelligibilitas formalis systematum logicorum et mathematicorum praesupponat discursum metalinguisticum irreducibilem ad linguam obiectivam; et utrum hic excessus non solum epistemicus sed ontologicus sit, ita ut ipsa possibilitas significationis in rebus fundetur; et utrum hic fundus intelligibilitatis recte intelligatur ut spatium teleologicum, quod systemata formalia non efficiunt sed quod ipsa attrahit et constituit.

Whether the formal intelligibility of logical and mathematical systems presupposes a metalinguistic discourse irreducible to object language; and whether this excess is not merely epistemic but ontological, such that the very possibility of signification is grounded in things themselves; and whether this ground of intelligibility is rightly understood as a teleological space which formal systems do not produce but which draws them forth and constitutes them.

Thesis

Formal systems do not generate intelligibility. They presuppose it. Every object language capable of truth conditions relies upon a meta-discourse that cannot be fully internalized without loss of the very properties that render the system intelligible. This excess is not merely epistemic but ontological. The possibility of meaning precedes formalization and belongs to the structure of reality itself.

This irreducible space of intelligibility may be described as teleological: not as an imposed purpose or subjective projection, but as the permanent possibility of meaningful determination that draws formal systems into being and coordinates their interpretation. Metalanguage thus testifies to an order of meaning that no formal system can exhaust, yet without which no formal system can be what it is.

Locus classicus

Gödel, Über formal unentscheidbare Sätze (1931)
“Es gibt innerhalb eines jeden hinreichend mächtigen formalen Systems wahre Sätze, die innerhalb dieses Systems nicht beweisbar sind.”

“There are, within every sufficiently powerful formal system, true propositions that cannot be proven within that system.”

Gödel’s result is not merely technical. It reveals that truth outruns formal derivability and that the conditions for recognizing truth are not fully capturable by the system whose truths are in question.

Peirce, Collected Papers 5.121
“Thirdness is the mode of being of that which is such as it is, in bringing a second and a first into relation.”

Peirce’s category of Thirdness names mediation, lawfulness, and intelligible continuity. It points beyond dyadic relations to the conditions under which relations can be meaningful at all.

Aristotle, Metaphysics Γ.4 (1006a)
τὸ αὐτὸ ἅμα ὑπάρχειν τε καὶ μὴ ὑπάρχειν ἀδύνατον

“It is impossible for the same thing to belong and not belong to the same thing at the same time.”

The principle of non-contradiction is not derived from a system; it governs the possibility of systemhood itself.

Explicatio

The inquiry into metalanguage arises not from philosophical curiosity but from the internal limits of formalization itself. Whenever a formal system is sufficiently expressive to represent arithmetic, syntax, or inference, it becomes possible to ask questions about the system as a system: about its consistency, its completeness, its interpretability, and its truth conditions. These questions are not posed within the object language alone but from a vantage that speaks about the system. This vantage is meta-discourse.

Gödel’s incompleteness theorems make this structural distinction unavoidable. The encoding of syntactic relations by Gödel numbering allows statements about provability to be represented within arithmetic. Yet the recognition of undecidable truths still requires a standpoint that distinguishes truth from provability. That distinction is not eliminable. Even when meta-statements are formalized, the act of recognizing the adequacy of that formalization occurs at a higher level still. The meta recedes as it is formalized. What is gained in rigor is offset by a renewed excess.

This phenomenon is not accidental. It reveals something essential about intelligibility itself. Formal systems can model relations, generate derivations, and define extensions. What they cannot do is generate the conditions under which their own operations are meaningful. The possibility of interpretation is not a theorem of the system; it is the horizon within which the system can appear as intelligible at all.

This horizon is not merely epistemic. It is not simply a limitation of human cognition or a defect in symbolic manipulation. It belongs to the nature of formal structures themselves. A system that could exhaustively account for its own intelligibility would collapse the distinction between object language and metalanguage, thereby eliminating the very conditions that make interpretation possible. Meaning would be flattened into mechanism, and truth into derivability.

To say this is not to disparage formal rigor. On the contrary, it is formal rigor that reveals the necessity of this distinction. Logic itself teaches that intelligibility cannot be fully objectified without remainder. The meta is not an embarrassment to formalism; it is its condition.

This irreducible excess may be clarified by reconstructing Peirce’s notion of Thirdness. Thirdness is not merely a category of mediation within thought. It names the lawful continuity that makes relations intelligible. It is that by virtue of which signs signify, laws govern, and inference is possible. In this sense Thirdness is not added to dyadic relations; it is what allows relations to be relations rather than brute collisions.

What Peirce names phenomenologically, we may here name ontologically. The intelligibility that coordinates formal systems is not imposed from outside but belongs to the structure of reality. Formal systems are not self-originating. They are drawn into being by the possibility of meaning that precedes them. This possibility is not itself formal, yet it is not indeterminate. It orders, constrains, and directs formalization without being reducible to it.

Whitehead’s notion of prehension may serve as an analogy. Prehensions are not actual entities but the permanent possibilities of actualization. They are not events but the conditions under which events can occur meaningfully. In an analogous way, intelligibility is not itself a formal structure but the permanent possibility of formal meaning. It is that by which formal systems can be interpreted, related, and evaluated.

This is why attempts to algorithmize theory change inevitably fail. To formalize the rules by which theories are revised presupposes a prior understanding of relevance, adequacy, and success—concepts that themselves resist algorithmic capture. The criteria of revision always exceed the system being revised. The ladder by which the system ascends cannot be retained within the system without contradiction.

Wittgenstein’s Tractatus gestures toward this limit. What cannot be said must be shown. Yet showing is not mute. It is a mode of intelligibility that precedes explicit articulation. There is no seeing that could not, in principle, be spoken—but the speaking presupposes the very space it attempts to articulate. The ladder cannot be climbed unless it already stands.

Kant’s distinction between determining and reflecting judgment clarifies this further. Determining judgment subsumes particulars under given rules. Reflecting judgment seeks the rule under which particulars may be unified. The former may be formalized. The latter resists algorithmic closure. Reflecting judgment operates within a teleological space: it seeks coherence, purposiveness, and meaning without presupposing a determinate schema. This space is not subjective whim. It is the condition under which object languages can be coordinated at all.

Thus intelligibility is teleological not because it aims at a humanly imposed end, but because it orients formal structures toward meaning. Formal systems are “pulled into being” by this space. They do not emerge ex nihilo. They are responses to a prior call of intelligibility that is written into the structure of reality itself.

Objectiones

Ob I. If intelligibility exceeds formal systems, then rigor is compromised and mathematics collapses into metaphysics.

Ob II. Metalanguage reflects only human cognitive limitation, not any ontological feature of reality.

Ob III. Teleology introduces purpose into domains governed solely by efficient causality.

Ob IV. If intelligibility cannot be formalized, then it cannot be known or discussed without contradiction.

Responsiones

Ad I. Rigor is not compromised but clarified. Formal precision reveals the limits of formalization. To acknowledge these limits is not to abandon rigor but to respect its conditions.

Ad II. The recurrence of metalanguage is not contingent upon human psychology. It arises from the structure of formal systems themselves. Any intelligence capable of truth would confront the same distinction.

Ad III. Teleology here names orientation toward meaning, not extrinsic purpose. It does not replace efficient causality but grounds the intelligibility of causal explanation.

Ad IV. Intelligibility can be discussed analogically and architectonically without being reduced to an object language. Such discourse does not eliminate the meta; it inhabits it knowingly.

Nota

This disputation functions as an intermezzo within the Disputationes Theologicae. It neither advances a new doctrinal locus nor resolves a previously posed theological question. Rather, it renders explicit the conditions of intelligibility presupposed by everything that precedes and everything that follows.

Up to this point, the inquiry has examined language, truth, relation, participation, causality, and manifestation within the horizon of theological discourse. What has remained implicit, however, is the space within which such discourse can appear as intelligible at all. Here that space is named. The question is no longer what theology says, but what must already be the case for saying anything meaningfully.

The significance of Kurt Gödel is therefore not merely technical. His results disclose a structural excess that no formal system can eliminate: truth outruns derivability, and intelligibility cannot be fully internalized without remainder. Logic thus bears witness to a distinction it cannot overcome. Far from displacing metaphysics, formal rigor summons it by revealing the conditions it cannot itself supply.

The appeal to Charles Sanders Peirce clarifies the ontological character of this excess. Thirdness is not invoked here as a semiotic category but as the mode of being through which relations are intelligible rather than merely given. It names lawful continuity, mediation, and normativity as features of reality itself. Formal systems do not generate these features. They presuppose them.

Likewise, the principle articulated by Aristotle does not arise from within a system but governs the very possibility of systemhood. Non-contradiction is not an axiom among others. It is the condition under which axioms can function at all. In this sense, logic testifies to an order it inhabits but does not constitute.

What emerges is an account of intelligibility as teleological. This does not introduce purpose as an extrinsic aim or subjective projection. It names the orientation of reality toward meaning, coherence, and determination. Formal systems are drawn into articulation by this orientation. They are responses to intelligibility, not its source.

This recognition decisively blocks both reductionism and voluntarism. Meaning is neither manufactured by minds nor imposed by decree. It is discovered as a feature of reality that precedes formalization and renders it possible. The humanities and the formal sciences converge here, not in method but in vocation: both seek the conditions under which truth can appear as truth.

The theological implications are now unavoidable, though they remain deliberately unasserted. If intelligibility belongs to the structure of reality, then meaning is not accidental. If meaning is not accidental, then the question of Logos presses forward, not as a speculative hypothesis, but as the name for the ground of intelligibility itself. The inquiry is thus poised to move from the conditions of meaning to the structures of order through which meaning abides.

Determinatio

1. Formal systems presuppose intelligibility and do not generate it.

2. No sufficiently expressive system can internalize the conditions of its own truth.

3. The distinction between object language and metalanguage is irreducible.

4. This irreducibility is ontological, not merely epistemic.

5. Intelligibility constitutes a teleological space of meaning.

6. Formal systems are drawn into being by this space rather than constituting it.

Transitus 

If the intelligibility of formal systems presupposes an irreducible metadiscursive horizon, and if this horizon belongs not merely to cognition but to the being of things themselves, then intelligibility cannot be treated as an incidental feature of formalization. It must instead be understood as a stable orientation of reality toward meaning.

Yet intelligibility that remains merely excess would be indeterminate. If meaning is to be communicable, repeatable, and answerable to truth, then it must assume a form capable of persistence without exhaustion. The question therefore presses beyond the conditions of meaning toward the mode by which meaning abides.

What is now required is an account of order that neither collapses into mechanism nor dissolves into abstraction. Such order cannot arise from formal systems alone, nor can it be reduced to patterns of occurrence. It must instead name the way intelligibility attains stability within reality itself.

We are therefore compelled to consider law. Not law as a descriptive regularity, nor as an axiom internal to a formal system, but as a mode of being through which intelligibility is sustained, communicated, and made normative.

Accordingly, the inquiry now turns to the nature of law and regularity, and to the question whether the order they express belongs merely to phenomena or to the ontological ground of intelligibility itself.

Disputatio LIII: De Felicitate Theologica: Utrum Spiritus Sit Auctor Locutionis Fideli

 On Theological Felicity: Whether the Spirit is the Author of Faithful Speech

Quaeritur

Utrum felicitas locutionis theologicae, id est, rectitudo, auctoritas, et veritas performativa sermonis fidei, non ex intentione vel peritia humana oriatur, sed ex ipso Spiritu Sancto qui loquentem informat, linguam fidei custodiens, purgans, et in Verbo ordinans.

Whether the felicity of theological speech—its rightness, authority, and performative truth—arises not from human intention or rhetorical skill but from the Holy Spirit, who forms the speaker, guards the language of faith, and orders it to the Word.

Thesis

Theological felicity is Spirit-authored rightness of speech. A theological utterance is felicitous not merely when it is grammatically correct or doctrinally sound, but when the Spirit authorizes the speech-act so that the real presence of the Logos (Disp. LI) and the constitutive truth (Disp. L) are authorized for creaturely utterance in one act of fidelis locutio.”

Thus: Felicity just in case forma recta + auctoritas Spiritus + ordinatio ad Verbum. The creature speaks truthfully because the Spirit speaks in, with, and through the creature.

Locus Classicus

1. 1 Corinthians 12:3 — οὐδεὶς δύναται εἰπεῖν· Κύριος Ἰησοῦς, εἰ μὴ ἐν Πνεύματι Ἁγίῳ

“No one can say ‘Jesus is Lord’ except in the Holy Spirit.”

Since the simplest and most central Christian confession is impossible without the Spirit, felicity is pneumatic.

2. Romans 8:26 — τὸ Πνεῦμα συναντιλαμβάνεται τῇ ἀσθενείᾳ ἡμῶν

“The Spirit helps us in our weakness… He intercedes with groanings too deep for words.”

The Spirit perfects our speech when our words fail.

3. John 14:26 — ἐκεῖνος διδάξει ὑμᾶς πάντα

“The Spirit will teach you all things and remind you of all that I have said.”

Speech becomes felicitous when it is brought under the teaching and remembrance of the Spirit.

4. Augustine, De Trinitate XV.19

Spiritus est nexus amoris quo redimus ad Verbum.
“The Spirit is the bond of love through whom we return to the Word.”

The Spirit links the human speaker to the Word He speaks.

5. Luther, WA 10/3, 14

Spiritus Sanctus est verus doctor verbi.
“The Holy Spirit is the true teacher of the Word.”

Preaching is felicitous only as the Spirit’s work.

Explicatio

Disputatio LII established that reference in theology is donation, that the Spirit gives the res. Yet the possession of a donated res does not by itself yield a felicitous assertion. Between the ontological gift of the thing and the faithful utterance of the Word, another act is required. This act is not interpretive mediation but authorization.

1. Felicity as Pneumatic Authorization

In theological speech, felicity is not reducible to correctness of syntax, accuracy of doctrinal formulation, sincerity of intention, rhetorical force, or conceptual clarity. All of these may be present without faithful speech occurring. Felicity consists rather in the Holy Spirit’s act of authorizing a finite utterance to function as faithful speech within the order of the Word.

This authorization does not interpret the Word, translate the Word, or supply meaning to the Word. It grants the speaker the right to speak under the Word, so that the utterance stands as obedient proclamation rather than autonomous discourse.

2. The Structure of Felicity

A theological utterance is felicitous if and only if two conditions are jointly satisfied.

First, the utterance must satisfy the internal conditions of theological grammar: it must be well formed, consistent, coherent, and suitably derivable within the rule governed language of faith.

Second, the utterance must be externally authorized by the Holy Spirit, who orders it to the Word and grants it the status of faithful speech.

This is why Paul says:

“We speak not in words taught by human wisdom, but taught by the Spirit” (1 Cor 2:13).

The contrast is not between interpretation and its absence, but between speech generated by human authority and speech authorized by the Spirit.

3. Felicity and the Operator Λ ⊨* Tₜ

Truth through the Logos (Λ ⊨* Tₜ) concerns the constitutive grounding of theological truth in the divine act. Felicity does not add content to this truth, nor does it mediate its meaning. Rather, felicity concerns whether a particular utterance may bear that truth as faithful speech.

Felicity is thus the Spirit’s authorization of a grammatically proper utterance to function as a vehicle of truth, not by interpretive enrichment, but by pneumatic commissioning.

A felicitous theological assertion occurs when a Spirit authorized utterance is permitted to stand within the Church as obedient speech under the Logos.

4. Felicity as Participation

To speak felicitously is to participate in the Logos’ constitutive act (L), the Logos’ real presence (LI), and the Spirit’s authorizing work (LIII). Human speech does not become divine speech by interpretation, but is taken up into divine speech by authorization.

Accordingly, theological language remains fully creaturely in form while becoming faithful in act. Felicity is the mode by which creaturely speech is grafted into divine discourse without ceasing to be creaturely.

Objectiones

Ob I: According to the speech act theory of Austin and Searle, felicity conditions are constituted by socially established conventions governing successful performance. If a speech act satisfies the relevant conventional conditions, it is felicitous. Therefore theological felicity requires no pneumatic authorization beyond conformity to established pragmatic rules.

Ob II: Classical Protestant orthodoxy assumes that speech is felicitous when it conforms to orthodox doctrine. If this is so, divine authorization appears unnecessary.

Ob III: Liberal Protestantism claims that truthful speech arises from the authenticity of the speaker’s self-expression. If so, felicity does not require external divine agency.

Ob IV: Contemporary linguistic philosophy maintains that felicity consists in correct rule following within a linguistic practice. If a theological utterance conforms to the grammar, norms, and inferential roles of ecclesial language, no further authorization is required. Therefore felicity is exhausted by internal linguistic propriety.

Ob V: Barthian Theology declares that since human speech cannot bear divine truth as such, God alone speaks truly. If this is the case, talk of Spirit authorized human felicity collapses either into interpretation or into an incoherent hybrid of divine and human speech. 

Responsiones

Ad I: Speech act theory correctly identifies conditions governing the successful performance of human acts within social practices, but it does not account for the authorization of speech to bear divine truth. Austinian felicity concerns whether an act counts as performed within a convention; theological felicity concerns whether an utterance is permitted to stand as faithful speech under the Word. The Spirit is not an additional pragmatic condition alongside human conventions, but the agent who grants authority to speak in the name of the Word. Speech act theory explains how acts function; it cannot explain how creaturely speech becomes obedient proclamation rather than autonomous performance.

Ad II: Orthodoxy is necessary but not sufficient. One may confess correct propositions without the Spirit’s life. Felicity requires authorization, not merely accuracy.

Ad III: Authenticity is indexical to the self; felicity is ordered to the Logos. Theological speech is not self-expression but participation in divine speech.

Ad IV: Rule following governs the form of theological language, not its authority. An utterance may be grammatically correct, inferentially coherent, and ecclesially recognizable, yet remain unauthorised speech. Felicity does not arise from conformity to linguistic rules alone, nor does it emerge from participation in a linguistic practice as such. Rather, the Holy Spirit authorizes a rule governed utterance to stand as faithful speech under the Word. Grammar determines what can be said; the Spirit determines whether it may be said.

Ad V: Barth is correct to deny that human speech can, by its own capacity, bear divine truth. Yet this denial does not exclude Spirit authorized human speech; it presupposes it. The Spirit does not convert human words into divine words by interpretation, nor does He replace human speech with divine monologue. Instead, He authorizes creaturely utterance to function as obedient proclamation. Felicity names the mode by which God’s speech becomes present in human speech without ceasing to be God’s act or the creature’s act. Human speech remains human in form and origin, yet becomes faithful by divine authorization.

Nota

Felicity is the Spirit’s bridging act between the ontological donation of the res (Disp. LII) and the faithful assertion of truth (Disp. L). It is the pneumatic fitting of human speech to divine being. Thus, we can claim the following about the Trinity: 

• The Father constitutes truth.

• The Son is present as truth.

• The Spirit donates the res and authorizes the word.

Felicity is the Spirit’s signature on human speech because without felicity doctrine becomes mere abstraction, the sacrament becomes only a symbol, preaching is only exhortation, and theology remains only grammar. However, with felicity doctrine becomes light; the sacrament becomes communion; preaching becomes divine address; and theology becomes true participation.

Determinatio

We determine that:

1. Felicity is Spirit-authored, not humanly achieved.

2. A theological utterance is felicitous when the Spirit authorizes it to stand as faithful speech under the Word.”

3. Felicity unites presence, donation, and truth, completing the semantic-ontological structure of theological meaning.

4. The Spirit’s act is the condition of faithful, truthful, and effective theological speech.

5. Thus, the Spirit makes human speech a participation in divine discourse.

Transitus ad Disputationem LIV

Having established that the Spirit authorizes speech to carry the divine res, we now turn to the final structural element of our semantic theory and ask as to why divine acts require a hyperintensional semantics. For if felicity depends on Spirit-authorization rather than mere extension or modal profile, then divine acts must be individuated at a finer semantic grain than extensional or modal semantics allow.

Thus, we proceed to Disputatio LIV: De Hyperintensionalitate Divinae Operationis: Utrum Actus Dei Non Sint Reducibiles ad Extensiones vel Possibilia, in which we ask whether divine acts differ in such a fine-grained manner that no extensional or modal semantics can capture their truth.

Disputatio XXVIII De Systemate Incompleto et Veritatis Factore Infinito

On the Incomplete System and the Infinite Truthmaker

Quaeritur

Quaeritur utrum systema finitum, si sit consistent, possit continere veritatem suam propriam, an vero, iuxta theoremata incompleti Gödeliana, omnis ordo finitus necessario referat ad veritatis fontem extra se—ad infinitum veritatis factorem.

It is asked whether a finite system, if consistent, can contain its own truth, or whether—according to Gödel’s incompleteness theorems—every finite order must necessarily refer to a source of truth beyond itself, to an infinite truthmaker.

Thesis

Gödel’s incompleteness results demonstrate formally what metaphysics has long intuited: The finite cannot ground the totality of its own truth. Every consistent formal system sufficient for arithmetic contains true statements it cannot prove. Hence, truth exceeds derivation, and the complete explanation of truth demands participation in something transcending the finite system.

Locus Classicus

“Great is our Lord, and abundant in power; his understanding is infinite.”
— Psalm 147:5

Aquinas comments: “Intellectus divinus est infinitus, quia adaequat veritatem ipsius Dei, quae est infinitum esse.” (STI.14.6.) The divine intellect alone comprehends all truth as being identical to being. Human or finite systems of reason, by contrast, express truth participatively, that is, as reflections of the infinite intellect. Thus, the logic of finitude corresponds to the metaphysics of participation.

Explicatio

I. The Context of Gödel’s Discovery

In 1931, 25 year-old Kurt Gödel, an Austrian logician, published “Über formal unentscheidbare Sätze der Principia Mathematica und verwandter Systeme” (Monatshefte für Mathematik und Physik 38, 1931). His goal was to investigate the limits of formal systems such as the Principia Mathematica by Whitehead and Russell, which sought to derive all mathematical truths from a finite set of axioms through mechanical rules of deduction.

To understand the significance of this, we must review some key notions. A formal system may be thought of as a rigorously defined language governed by rules. While its syntactic component consists of symbols and derivations its semantic component is concerned with truth and meaning about numbers or other entities to which it refers. For such a system to be a satisfactory foundation of mathematics, it must have two crucial properties:

1. Consistency: No contradiction can be derived within the system.

2. Completeness: Every true statement expressible in the system can be derived from the system's axioms.

Gödel’s work proved that these two properties cannot coexist in any finite system capable of expressing arithmetic.

II. Gödel’s First Incompleteness Theorem

Gödel showed in this proof how to assign to each formula and proof a numerical code, a process that is now called Gödel numbering. By this ingenious device, statements about formulas could become statements about numbers. He then constructed a sentence G that effectively says of itself,

“This statement is not provable within this system.”

If the system is consistent, it cannot prove G, for to do so would render it inconsistent, that is, it would prove a falsehood. Yet if the system is consistent, G is in fact true, since its unprovability makes the assertion it contains correct. Hence, G is true but unprovable within the system. The upshot of this is this: No consistent, sufficiently expressive finite system can be complete. Simply put, there will always exist true propositions that escape its derivations.

III. Gödel’s Second Incompleteness Theorem

Gödel then proved a deeper corollary, that no consistent system can prove its own consistency. But to show that its axioms are non-contradictory, one must appeal to a meta-system, to a higher language standing outside the system itself. Hence, every finite logical order depends on another for its assurance of truth and coherence.

IV. Philosophical Significance

Gödel’s theorems thus reveal a structural transcendence of truth over formal expression. They are not merely mathematical curiosities but demonstrations of a universal condition of finitude, that truth always surpasses the framework that tries to contain it. Every closed system that seeks to explain itself without remainder either collapses into contradiction or appeals to a higher order.

Metaphysically, this mirrors the ancient insight that the finite requires the infinite as its truthmaker. The correspondence between logical form and ontological order is not accidental but structural: just as a formal system needs a meta-system to ground its truth, so the finite world needs a transcendent act of being to ground its reality.

What Gödel discovered formally, metaphysics already discerned existentially: veritas non est intra ordinem finitum nisi per participationem veritatis infiniti.

Obiectiones

Ob I. Formalists like David Hilbert hold that the incompleteness theorems apply only to mathematical systems, not to reality. They concern symbols and proofs, not the metaphysical order of being.

Ob II. Scientific empiricism argues that science does not need to be “complete” in this logical sense. Explanatory power depends on observation, not on formal derivation. Thus, Gödel’s results have no bearing on physical intelligibility.

Ob III. Reductive naturalists claim that the analogy between formal systems and the finite world is metaphorical, and thus to move from logical incompleteness to ontological dependence is an illicit category jump.

Ob IV. Skeptics of many kinds opine that Gödel’s theorem requires arithmetic within a system, and that nature is not a formal calculus. Accordingly, it is meaningless to say that the universe is “incomplete” in the Gödelian sense.

Ob V. The cautious theologian claims that appealing to Gödel to prove divine necessity risks confusing logic with revelation. God’s infinity is not a corollary of syntax but a matter of faith.

Responsiones

Ad I. Gödel’s theorems indeed concern formal systems, yet they express a universal relation between expression and truth. Wherever truth is represented within a finite structure, that structure cannot exhaust it. The logical limit mirrors an ontological condition.

Ad II. Scientific explanation presupposes coherence and consistency within its theories. Gödel shows that such coherence cannot be self-guaranteed; it must be received from a higher frame. Hence, the dependence of empirical science on deeper intelligibility is reinforced, not diminished.

Ad III. The analogy is legitimate when carefully drawn. Formal systems model the relation of expression to truth; the finite world models the relation of being to its source. In both, self-sufficiency proves impossible; participation becomes the only path to completeness.

Ad IV. The universe is not a calculus, yet our reason reflects its structure through logic.To say that the world is “Gödelian” is not to mathematize it but to recognize that finitude, even in its most abstract forms, cannot close upon itself.

Ad V. The appeal to Gödel is not a theological proof but a formal analogy. It illuminates by example what theology asserts by revelation: that all truth in the finite is truth by participation in the Infinite Word.

Nota

Gödel’s theorem exposes not merely a boundary of formal systems but a metaphysical structure, for the finite, in order to remain consistent, must remain open to what it cannot contain. Incompleteness is thus not a defect but the mark of dependence. The object system’s unprovable truths are signs of an order beyond itself, an order upon which its very coherence rests.

In theology, this structure mirrors creation’s relation to its Creator. The creature is a consistent finite system whose truth is guaranteed only by participation in the infinite. Every finite logos, to be true, must be grounded in a Logos that transcends it; every rational discourse presupposes an unspoken act that makes discourse possible.

Hence Gödel’s discovery becomes a theological axiom: truth cannot be self-enclosed. Simply put, there must exist an actus essendi veritatis, an infinite truthmaker, by whom the finite is both comprehensible and incomplete. Logical incompleteness is thus a formal echo of the metaphysical participation of the finite in the divine, and the incompleteness of the finite itself. It reveals that closure is illusion, and openness to transcendence is the very condition of truth.

Determinatio

From the foregoing it is determined that:

1. Gödel’s incompleteness theorems formally demonstrate the incapacity of the finite for self-completion. Every consistent system depends upon truths it cannot contain and upon a meta-system it cannot itself generate.

2. Truth transcends formal derivation. Just as no calculus can produce all truths of arithmetic, no finite ontology can account for its own intelligibility.

3. Consistency requires transcendence. The assurance that a system is non-contradictory always arises from a higher standpoint.
   Ontologically, this implies that the finite world’s coherence depends on an Infinite act of being.

4. The Infinite functions as the universal truthmaker. The meta-system for logic corresponds analogically to the Creator for creation: the necessary being in whom all contingent truths are grounded and from whom their coherence flows.

5. Therefore, Gödel’s result, though mathematical in form, reveals a metaphysical truth: the finite is intelligible only by participation in the Infinite. The world’s incompleteness is not deficiency but sign — a structural openness to the Infinite intellect whose understanding is unbounded.

Hence, the incompleteness of systems becomes a formal witness within reason to the metaphysical participation of all truth in God — in quo sunt omnes thesauri sapientiae et scientiae absconditi (Colossians 2:3).

Transitus ad Disputationem XXIX

If every finite order requires an infinite truthmaker, how can finite language and models still signify truly? The following disputation explores the paradox of internal and external truth uncovered by the Löwenheim–Skolem theorem, showing how the structure of theology mirrors the relation between truth in a model and truth about it. 

We turn, therefore, to Disputatio XXIX: De Paradoxo Löwenheim–Skolemiano, wherein we examine how truth within a model and truth about that model diverge, and how this divergence reveals the theological relation between faith’s internal coherence and the infinite reality of God.