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Sorites paradox

The Sorites paradox, also known as the paradox of the heap, is a classical problem in philosophy and logic that arises from the vagueness inherent in certain predicates of natural language, such as "heap" or "bald," leading to an apparent contradiction when classical bivalent logic is applied to incremental changes.^[1]^[2] In its canonical formulation, the paradox begins with the premise that a single grain of sand does not constitute a heap, and proceeds by noting that removing one grain from a heap (or adding one to a non-heap) does not alter its status as such; by repeated application, this tolerance for small changes implies that even a single grain—or none at all—must be a heap, which is intuitively absurd.^[1]^[2] The paradox is traditionally attributed to the ancient Greek philosopher Eubulides of Miletus, a member of the Megarian school in the 4th century BCE, though its roots may trace back further to pre-Socratic thinkers like Zeno of Elea or even Anaxagoras, with early formulations possibly predating Democritus's atomistic ideas around the 5th century BCE.^[1]^[2] After being discussed in antiquity by figures such as Aristotle and Cicero, the Sorites fell out of prominence during the medieval period but experienced a significant revival in the late 20th century, particularly from the 1960s onward, amid renewed interest in vagueness, semantics, and non-classical logics.^[1] Modern scholarship, including works by Timothy Williamson (1994) and Roy Sorensen (2001), has explored its implications for epistemology, metaphysics, and the philosophy of language, emphasizing intuitions like the absence of sharp boundaries (no precise cutoff between "heap" and "non-heap") and the principle that ontologically indiscernible items (e.g., adjacent grains) should share the same predicate.^[2] Philosophically, the Sorites paradox underscores the tension between the tolerance intuition—that vague terms allow small perturbations without changing truth value—and the need for determinate semantic boundaries, challenging bivalence (the idea that every proposition is either true or false) and prompting debates over higher-order vagueness, where even the boundaries of vagueness itself lack precision.^[2] Proposed resolutions include epistemicism, which posits that sharp boundaries exist but are unknowable (as defended by Williamson); supervaluationism, which assigns truth values based on a range of admissible precisifications; and nihilism or dialetheism, which rejects bivalence or accepts true contradictions in borderline cases.^[2] Despite these approaches, no consensus solution has emerged, making the Sorites a enduring touchstone for understanding vagueness in cognition, perception, and linguistic norms.^[1]^[2]

Formulations of the Paradox

Original Formulation

The Sorites paradox is attributed to the ancient Greek philosopher Eubulides of Miletus, a member of the Megarian school active in the 4th century BCE.^[3] Eubulides is credited with formulating several logical paradoxes, including the Sorites, which derives its name from the Greek word sōros (σῶρος), meaning "heap."^[3] This puzzle highlights the challenges posed by vague predicates in language and reasoning, emerging from ancient debates on dialectic and logic.^[3] The classic formulation of the paradox centers on the concept of a "heap" of sand, posing an inductive argument that leads to an apparent contradiction. It begins with the observation that a single grain of sand does not constitute a heap. From there, the reasoning proceeds by adding grains one at a time: if one grain is not a heap, then two grains are not a heap; if two are not, then three are not; and so on, through successive steps. By this inductive process, the argument concludes that even a vast number of grains, such as one million, fails to form a heap—contradicting the intuitive judgment that such a quantity clearly does.^[3] The paradox rests on three key premises that drive the contradiction. First, a single grain of sand is not a heap, which seems uncontroversially true given the ordinary meaning of "heap."^[3] Second, adding one grain to a heap still results in a heap, reflecting the tolerance of the predicate "heap" to minor additions—removing one grain from a heap leaves it a heap, or equivalently, the contrapositive ensures that adding one grain to a non-heap yields a non-heap.^[3] Third, the inductive step applies universally: for any number n, if n grains do not form a heap, then n+1 grains do not either, allowing the chain of reasoning to extend indefinitely and produce the absurd outcome that no amount of sand ever forms a heap.^[3] This tension arises from what is known as a Sorites series, a sequence of cases where each consecutive pair differs only marginally, such as by a single grain, making it difficult to pinpoint a precise boundary for the vague predicate "is a heap."^[3] The paradox exploits the failure of transitivity in such predicates: while adjacent cases in the series may share the same status (e.g., both non-heaps or both heaps), the overall series connects clearly distinct endpoints, like one grain and a million grains, leading to inconsistent application of the concept across the continuum.^[3]

Key Variations

One prominent variation of the Sorites paradox applies to the predicate "bald," where a man with no hair is clearly bald, but adding one hair at a time leads to the counterintuitive conclusion that even a man with a full head of hair is bald, as each incremental addition preserves baldness.^[3] Similarly, the paradox can be formulated around height and the predicate "tall": a person who is 7 feet tall is tall, yet reducing height by a minuscule amount—such as the thickness of an atom—repeatedly should not alter this status, implying that no one is truly tall. These examples illustrate how the paradox extends beyond mere quantities to personal attributes, maintaining the core inductive structure where tolerance for small changes erodes clear boundaries. Another key variation involves color gradations, such as in a spectrum blending from pure red to pinkish-red: a shade at one end is unambiguously red, but gradual shifts toward pink—each differing imperceptibly—suggest that there is no precise point where the color ceases to be red, rendering the entire spectrum red or pink without distinction.^[2] This adaptation highlights applications to qualitative continua, where perceptual blending challenges sharp categorizations in everyday language, unlike the quantitative accumulation in the original grain example. Higher-order Sorites paradoxes arise when vagueness applies to the boundaries themselves, such as determining when a collection "definitely" becomes a heap or when something is "borderline bald," leading to nested inductive arguments that question the precision of vagueness itself.^[4] In these cases, the paradox persists by chaining tolerances across levels of description, applying to meta-predicates like "vague" or "borderline" and complicating efforts to draw any fixed lines. Post-Eubulides, the Sorites structure appeared in medieval logic discussions of vague terms and insolubles, influencing treatments of boundary problems in scholastic debates, though often intertwined with self-referential paradoxes.^[5] Across these variations, the inductive chain remains intact, demonstrating the paradox's universality in exposing tolerance principles for vague predicates in both quantitative and qualitative domains.

General Conditional Form

The general conditional form of the Sorites paradox abstracts the argument into a logical structure applicable to any vague predicate F, where a series of objects \alpha_1, \alpha_2, \dots, \alpha_n are ordered such that each subsequent member differs minimally from the previous one, and the application of F is intuitively tolerant of such small changes.^[3] The argument begins with a base case, asserting that F(\alpha_1) (or more commonly its negation, \neg F(\alpha_1)), such as deeming a single grain not a heap, and proceeds via a chain of conditional premises: if F(\alpha_k), then F(\alpha_{k+1}) for each k from 1 to n-1.^[3] Repeated application of modus ponens yields the counterintuitive conclusion that F(\alpha_n) (or \neg F(\alpha_n)), as with a large collection still not forming a heap, generating a contradiction with common sense.^[3] This structure can be formalized more compactly using universal quantification over the series: \forall k (F(\alpha_k) \rightarrow F(\alpha_{k+1})) \land \neg F(\alpha_1) \vdash \neg F(\alpha_n) for sufficiently large n.^[3] The universal quantifier captures the tolerance principle inherent in vague predicates, positing that no sharp boundary exists across the incremental steps, which drives the inductive spread of the predicate (or its negation) throughout the entire series.^[3] This clashes with classical bivalence, the assumption that every statement is either true or false, because the sorites chain forces the predicate to apply (or not) uniformly, yet intuition resists both the base case propagating to the endpoint and any abrupt cutoff in the middle.^[3] The conditional form distinguishes between simple and complex variants of the sorites. The simple sorites relies directly on the chain of individual conditionals and successive modus ponens applications, without explicit reference to quantification or induction.^[3] In contrast, the complex sorites incorporates mathematical induction explicitly, as in the schema F(\alpha_1) \land \forall k (F(\alpha_k) \rightarrow F(\alpha_{k+1})) \vdash \forall k F(\alpha_k), emphasizing the logical validity of the inference while highlighting the paradox's reliance on the universal tolerance premise.^[3]

Logical and Philosophical Analysis

The Continuum Fallacy Connection

The continuum fallacy, also known as the fallacy of the beard or the line-drawing fallacy, occurs when one argues that because a property or quality varies continuously along a spectrum—such as height or wealth—no sharp or meaningful distinctions can be drawn between categories at the endpoints, such as "adult" versus "child" or "rich" versus "poor."^[6] This reasoning erroneously concludes that the existence of intermediate gradations invalidates discrete classifications altogether, often to dismiss the applicability of binary or threshold-based concepts.^[6] The Sorites paradox provides a direct illustration of the challenges underlying this fallacy, as it exploits the continuous nature of vague predicates—like "heap" in the case of accumulating grains of sand—to generate a chain of seemingly tolerable small changes that lead to an absurd denial of the predicate at one end of the spectrum.^[3] However, while the paradox highlights genuine tensions in applying vague terms across continua, the continuum fallacy misapplies this dynamic by overgeneralizing: it assumes that the absence of a precise, non-arbitrary cutoff point in every case entails the elimination of all boundaries, thereby rejecting valid categorizations that persist despite gradual transitions.^[3] For instance, the Sorites argument might suggest that removing one grain from a heap never results in a non-heap, leading to the conclusion that no heap exists; the fallacy extends this to claim that no useful distinction between "heap" and "non-heap" is possible at all.^[6] The term "continuum fallacy" emerged in post-20th-century philosophical discourse to critique informal arguments that invoke spectra to undermine normative or classificatory claims, building on ancient roots in paradoxes like the Sorites attributed to Eubulides of Miletus around the 4th century BCE.^[6] Modern formulations appear in discussions of moral and decision theory, where spectrum arguments—such as those positing a continuous range from beneficial to harmful actions—are identified as fallacious for assuming properties like moral goodness cannot hold at extremes without applying uniformly across the entire range.^[7] A crucial distinction lies in their philosophical status: the Sorites paradox constitutes a legitimate puzzle stemming from the inherent vagueness of natural language predicates, forcing reevaluation of tolerance principles and boundary conditions, whereas the continuum fallacy represents an invalid inference that conflates the difficulty of locating exact thresholds with their outright impossibility, often ignoring contextual or conventional boundaries that resolve apparent indeterminacy.^[3]^[7]

Argument Structure and Premises

The Sorites paradox arises from a chain of seemingly innocuous conditionals that collectively lead to an absurd conclusion, structured around three core premises. The first premise establishes a clear starting point, such as "one grain of sand is not a heap," which is intuitively true for minimal quantities.^[8] The second premise invokes the tolerance principle, asserting that small changes in the relevant parameter—such as adding or removing a single grain—do not affect the applicability of the vague predicate; formally, if n grains constitute a heap, then n+1 grains also constitute a heap.^[9] This principle reflects the intuitive idea that borderline adjustments in vague concepts like "heap" or "tall" preserve their status, as minor differences are imperceptible or irrelevant.^[8] The third premise relies on the sorites series, a finite sequence of incremental steps connecting the starting point to an endpoint where the predicate clearly fails to apply, such as progressing from one grain to a large pile that intuitively forms a heap.^[10] This series functions as a chain of conditionals, where transitivity ensures each step links via the tolerance principle, allowing modus ponens to propagate the negation of the predicate (e.g., "not a heap") across the entire sequence.^[11] Philosophically, the inductive step appears valid because it aligns with everyday judgments of similarity and continuity—removing one grain from a heap should not suddenly render it non-heap—yet repeated application yields absurdity, concluding that even a large collection is not a heap, contradicting ordinary usage.^[8] Classical logic exacerbates the paradox through the principle of bivalence and the law of excluded middle, which demand that every statement is either true or false, implying a sharp boundary where the predicate shifts from applicable to inapplicable.^[11] For any quantity n, it must be either a heap or not a heap, forcing a precise cutoff in the sorites series; however, the tolerance principle denies any such abrupt transition, as no single step could justify the change without violating intuitive continuity.^[10] This tension reveals the paradox's core challenge: sorites-style arguments, or "heaps of reasoning," undermine the precision of language by exposing how vague predicates resist binary classifications, compelling a reevaluation of how incremental reasoning applies to indeterminate concepts.^[8] The paradox particularly highlights the penumbral region, the intermediate zone in the sorites series where borderline cases cluster and vagueness intensifies, evading clear assignment to either side of the predicate without invoking an arbitrary threshold.^[12] In this penumbra, the inductive chain's validity falters not due to faulty steps but because the cumulative effect amplifies the absence of determinate boundaries, challenging the reliability of precise linguistic delineations in natural discourse.^[13]

Proposed Resolutions

Denying Vague Concepts

One approach to resolving the Sorites paradox involves denying the existence of genuinely vague predicates, positing instead that terms such as "heap" in the classic formulation—where adding a single grain to a non-heap eventually yields a heap—are merely imprecise and should be eliminated or redefined with exact boundaries in a regimented language. This view treats vagueness not as an ontological or semantic feature of reality or concepts, but as a defect in ordinary language that logic and philosophy must overcome by adopting precise alternatives, such as defining a "heap" as exactly 500 grains of sand for analytical purposes. Gottlob Frege, a foundational figure in this tradition, contended that vague predicates fail to refer properly because they lack sharp boundaries, rendering them meaningless in strict logical discourse and necessitating an ideal language free of such ambiguities.^[14] Bertrand Russell extended this perspective, asserting in his analysis of vagueness that all natural language predicates are inherently vague, but philosophical inquiry requires constructing artificial languages with precise terms to avoid paradoxes like the Sorites; for instance, he suggested replacing vague descriptors with mathematical or scientific exactitudes to preserve bivalence and classical logic. Similarly, W.V.O. Quine advocated eliminating vague terms from canonical notation, arguing that they introduce indeterminacy incompatible with rigorous ontology, and proposed regimenting language through variables and precise predicates to dissolve soritical chains without altering underlying logic. These early 20th-century nominalist and finitist influences, rooted in efforts to purify logic from linguistic flaws, represent a deflationary strategy where the paradox vanishes upon rejecting vague concepts as legitimate. The implications of this resolution are a commitment to sharp conceptual divisions in theoretical discourse, allowing the Sorites argument to fail at its premise of tolerance since no vague series exists in properly formulated language; however, it entails a significant departure from everyday usage, potentially rendering much of natural communication philosophically inadequate. Critics within this framework acknowledge that while it sidesteps the paradox effectively, the approach appears counterintuitive because vagueness permeates ordinary language without preventing functional communication, suggesting that eliminating it wholesale may overlook the adaptive utility of imprecise terms in non-logical contexts.^[15]

Imposing Fixed Boundaries

One resolution to the Sorites paradox entails stipulating arbitrary fixed boundaries for vague predicates, thereby interrupting the inductive chain by designating a specific threshold where the tolerance principle ceases to hold. In the heap formulation, for example, a boundary might be set at 1000 grains, such that 1000 grains constitute a heap while 999 do not; this renders the universal conditional false at that cutoff, as adding one grain to a non-heap does not necessarily produce a heap. This approach accepts the conventional imposition of sharpness to preserve logical consistency without altering the underlying vagueness of the concept.^[16] This method finds strong application in legal and practical domains, where precise thresholds are enforced for operational efficiency rather than philosophical accuracy. A prominent illustration is the establishment of age limits, such as 18 years for voting rights, which draws an arbitrary line on the vague notion of adulthood to facilitate uniform enforcement and societal function. Philosophers like Linda Claire Burns highlight how such pragmatic fixes emphasize utility in natural language use, treating boundaries as tools for resolving indeterminacy in actionable contexts.^[17]^[16] The primary advantage lies in its straightforward preservation of classical logic and bivalence, offering decisive resolutions that avoid theoretical complications while enabling real-world decisions. Nonetheless, critics note the drawbacks of arbitrariness, as the chosen cutoffs often appear capricious and disconnected from intuitive gradations, potentially yielding harsh or inequitable results at the margin. Ultimately, these boundaries function as social conventions, forged through collective agreement to serve practical ends rather than as revelations of objective facts.^[17]^[16]

Epistemic Approaches

Epistemic approaches to the Sorites paradox resolve the apparent contradiction by positing that vague predicates, such as "heap," possess precise, sharp boundaries in reality, but these boundaries are unknowable to human cognition due to inherent limitations in our knowledge-gathering capacities.^[18] For instance, there exists some exact number n of grains where n grains constitute a heap, but n-1 grains do not, even though no one can determine or know this precise threshold.^[19] This view, known as epistemicism, maintains that all statements involving vague terms are bivalent—either true or false—despite our ignorance, thereby preserving classical logic and avoiding the need to revise semantic or logical principles.^[18] The most prominent modern defense of epistemicism comes from philosopher Timothy Williamson, who argues that what we perceive as vagueness is fundamentally a matter of epistemic limitation: sharp facts about the world exist, but our evidence and cognitive faculties are insufficient to ascertain them.^[18] Williamson contends that the meanings of vague terms supervene on their use in a highly complex, fine-grained manner, such that slight variations in linguistic practice could shift the precise cutoff point without detectable change, rendering it unknowable.^[19] He employs principles like the safety condition for knowledge—where a true belief counts as knowledge only if it holds in nearby possible worlds—to explain why we cannot reliably identify these boundaries, as any candidate threshold risks being incorrect due to semantic plasticity.^[18] In addressing the Sorites series, epistemicism accepts the tolerance principle (adding one grain does not turn a non-heap into a heap) as holding true up to the unknown sharp boundary, where it abruptly fails, but since the boundary is unknowable, we cannot pinpoint the failure point.^[19] The paradox emerges, according to this view, from the erroneous assumption that the cutoff is knowable or that our ignorance does not preclude the existence of precise facts; thus, the inductive step in the Sorites argument must fail at some unknown n, without violating bivalence. Critics of epistemicism argue that it merely shifts the mystery of vagueness to the mystery of why such sharp boundaries remain perpetually unknowable, despite advances in observation or measurement, thereby failing to illuminate the phenomenon.^[19] Additionally, the theory struggles with higher-order vagueness, as the ignorance of the first-order boundary generates a new Sorites-like series about the boundary itself (e.g., when does one become ignorant of the cutoff?), potentially requiring an infinite regress of unknowable facts that epistemicism cannot adequately contain without ad hoc adjustments.^[21]

Semantic Theories of Vagueness

Semantic theories of vagueness address the Sorites paradox by redefining truth conditions for vague predicates through multiple valuations, rather than altering logical structure or denying vagueness outright. Supervaluationism, a prominent approach within this framework, posits that a vague sentence is true if and only if it is true relative to every admissible precisification of the language—a precisification being a sharpened version of the vague predicate with precise boundaries.^[22] This allows vague statements to retain classical logic while accommodating indeterminacy, as truth emerges from universal agreement across all permissible sharp interpretations.^[22] In the context of the heap example, consider the predicate "is a heap." An admissible set of precisifications might consist of sharp cutoffs ranging from, say, 10 to 100 grains, where each precisification assigns "heap" status to collections above its specific threshold and not below. The statement "100 grains form a heap" would then be true, since it holds in all such precisifications (as 100 exceeds every cutoff in the range), while "1 grain is a heap" is false, as it fails in all. Borderline cases, such as 50 grains, are neither true nor false, creating truth-value gaps in the penumbra where precisifications disagree.^[22] Supervaluationism resolves the Sorites paradox by validating the tolerance principle—adding one grain does not change heap status—only in regions where all precisifications agree, such as clear heaps or non-heaps, but it fails in the indeterminate penumbra, blocking the paradoxical inductive chain without arbitrary cutoffs. Kit Fine introduced this framework in his seminal 1975 paper, defending its use of supervaluations to preserve classical logic for vague languages.^[22] Rosanna Keefe further developed the theory, arguing it elegantly handles penumbral connections and tolerance. To address higher-order vagueness—the vagueness of boundaries themselves—supervaluationism extends the admissible set hierarchically, allowing super-truth for statements stable across stable subsets of precisifications, thus capturing indeterminacy at multiple levels without infinite regress.^[22] This approach maintains that vague predicates lack a single sharp boundary but are constrained by a continuum of acceptable ones, providing a semantic foundation for resolving Sorites-style arguments.

Alternative Logical Frameworks

Alternative logical frameworks address the Sorites paradox by employing non-classical logics that deviate from the principle of bivalence, allowing for truth-value gaps, gluts, or multiple degrees of truth to model vagueness without generating contradiction or requiring sharp boundaries.^[3] These approaches reject the classical assumption that every proposition is either true or false, instead accommodating borderline cases where predicates like "heap" apply indeterminately.^[23] By revising logical connectives or validity conditions, they block the soritical chain while preserving intuitive aspects of vague language.^[3] Gap theories posit that borderline cases lack a determinate truth value, rendering them neither true nor false and thus creating truth-value gaps.^[3] This rejects bivalence, allowing the conditional premises of the Sorites argument (e.g., adding one grain to a heap still yields a heap) to be gapped in borderline instances, making the argument unsound without denying tolerance outright.^[3] Proponents such as Kit Fine and Rosanna Keefe argue that this preserves the Tarskian constraint on truth for determinate cases while handling indeterminacy.^[3] Fuzzy logic extends this idea by assigning degrees of truth in the continuum [0,1], where a borderline heap might have a truth value like 0.5; the incremental tolerance premise then fails because truth degrees do not preserve full truth across steps, as small changes accumulate to alter overall validity.^[3] Conceptually, this can be modeled as the truth value V(F(n)) = min(1, V(F(n-1)) + δ), where F(n) is the predicate applied to n items, and δ is a small increment reflecting gradual application, ensuring the soritical induction does not reach full truth at the clear non-heap end.^[24] Truth glut theories, aligned with dialetheism, allow borderline cases to be both true and false, embracing contradictions in vague applications without logical explosion.^[25] This approach uses paraconsistent logic, which invalidates ex contradictione quodlibet to tolerate inconsistencies locally.^[23] Graham Priest, a leading proponent, applies dialetheism to the Sorites by viewing borderline heaps as dialetheias—truly heaps and non-heaps—resolving the paradox through semantic overdetermination rather than gaps.^[25] In paraconsistent systems like Priest's LP, the soritical premises hold as both true and false in borderlines, but the logic prevents the argument from deriving an outright contradiction like "one grain is a heap."^[23] Multi-valued logics generalize these ideas with more than two truth values to capture vagueness directly.^[26] Three-valued logics, such as Kleene's strong logic, introduce an "undefined" value alongside true and false, assigning it to borderline cases to gap the soritical chain where tolerance would force a jump.^[26] Infinite-valued systems like Łukasiewicz logic extend to a continuum of truth degrees [0,1], similar to fuzzy approaches, where connectives (e.g., the conditional as min(1, 1 - antecedent + consequent)) ensure gradual shifts in truth without abrupt cutoffs.^[26] Modern degree theories build on these, refining validity in non-truth-functional ways to align with intuitive judgments, as seen in Nicholas Smith's integration of degree theory with classical logic via supervaluational elements, though emphasizing gradual truth over admissible sharpenings.^[3] One practical resolution to the Sorites paradox involves hysteresis, a psychological phenomenon where the application of vague predicates depends on the direction of judgment in a sorites series, leading to context-dependent thresholds that prevent paradoxical chains. In reversal hysteresis, for instance, when subjects judge a sequence of hues from blue to green and then reverse the order, the point at which they shift from calling a patch "blue" to "borderline" occurs later in the forward direction than in the reverse, creating a hysteresis loop that "smooths" category shifts and explains why tolerance principles seem plausible without leading to contradiction. This approach, drawn from experimental psychology, resolves the paradox by relativizing truth to judgment ranges: a borderline case is permissible as either predicate in some ranges but not all, avoiding sharp boundaries while accommodating dynamic sorites arguments. Diana Raffman applies this to the heap example, where adding grains might form a heap more readily than removing them dissolves it, mirroring perceptual hysteresis in color judgment.^[27] Social resolutions emphasize community consensus in language use, treating vagueness as a feature of shared practices rather than individual error, inspired by Ludwig Wittgenstein's concept of language games where meaning arises from collective agreement on term application. In the Sorites context, a community might agree that 100 grains constitute a heap while 99 do not, not through a fixed rule but via practical consensus in everyday interactions, halting the paradoxical induction at socially negotiated points without denying vagueness. This Wittgensteinian view posits that sorites chains break because validity in concatenated arguments depends on communal norms, not abstract logic; for example, judgments about "heap" size vary by context (e.g., agricultural vs. philosophical discussions) but stabilize through group agreement. Hanoch Ben-Yami extends this by arguing that vague terms like "heap" or "bald" are resolved in social practices, where the paradox dissolves as language users implicitly accept non-transitive chains in favor of functional consensus.^[28] Utility theory offers a decision-theoretic resolution by treating vague predicates probabilistically, where boundaries are set to maximize expected utility rather than truth, avoiding sorites chains through cost-benefit analysis. In the self-torturer variant of the paradox—a person incrementally adjusting a device for small monetary gains but facing cumulative discomfort—rational agents assign probabilities to discomfort levels (e.g., 0.18 probability of slight pain at one notch) and compare utilities against baselines, ensuring transitive preferences by valuing small changes explicitly. This probabilistic approach resolves vagueness by recommending cutoffs based on expected utility maximization; for instance, one might deem a collection a "heap" at a size where the utility of handling it as such outweighs alternatives, even if incremental steps seem negligible. Alex Voorhoeve and Ken Binmore illustrate this with similarity-based decisions, where ignoring tiny differences leads to intransitivity, but utility calculations enforce consistent boundary placement.^[29] In modern applications, practical and social resolutions appear in AI ethics and law, where vague terms like "fair" or "harmful" employ algorithmic cutoffs or deliberative consensus to manage sorites-like indeterminacy. In AI systems, computational vagueness is handled via probabilistic thresholds in ethical decision-making, such as setting fairness boundaries in bias detection algorithms based on utility-maximizing group consensus, preventing paradoxical escalations in automated judgments (e.g., incrementally "unfair" data points accumulating to systemic bias). Legal contexts similarly use deliberative processes for vague statutes, like defining "reasonable doubt," where hysteresis-inspired directionality (e.g., burden of proof direction) and social agreement establish cutoffs without sharp lines. 21st-century developments, including fuzzy logic implementations in AI governance, draw on these to resolve vagueness in ethical AI deployment, as seen in frameworks balancing privacy harms through expected utility assessments.^[30]^[31]

References

[1]
Eubulides and his paradoxes | OUPblog
Aug 18, 2017 · The Greek for heap is soros. Hence, paradoxes of this kind are called Sorites paradoxes. Such paradoxes concern predicates that are vague in a ...<|control11|><|separator|>
[2]
[PDF] Chapter One: The Sources of Sorites - PhilArchive
Additionally, I survey ordinary intuitions that underlie Sorites paradoxes, and I note how these intuitions inform, and are informed by, a number of deeper ...
[3]
Sorites paradox - Stanford Encyclopedia of Philosophy
Jan 17, 1997 · The sorites paradox originated in an ancient puzzle that appears to be generated by vague terms, viz., terms with unclear (“blurred” or “fuzzy”) boundaries of ...
[4]
The sorites paradox and higher-order vagueness | Synthese
The sorites paradox and higher-order vagueness ... Article PDF. Download to read the full article text. Use our pre-submission checklist. Avoid common mistakes on ...
[5]
Logical Paradoxes | Internet Encyclopedia of Philosophy
A paradox is generally a puzzling conclusion we seem to be driven towards by our reasoning, but which is highly counterintuitive, nevertheless.<|control11|><|separator|>
[6]
The Fallacy of the Heap
The Fallacy of the Continuum ... Etymology: This fallacy takes its name from a particular example called "the paradox of the heap", or the "sorites" paradox.
[7]
The Continuum Fallacy in Moral Philosophy
### Summary of "The Continuum Fallacy in Moral Philosophy" by John Broome
[8]
None
Summary of each segment:
[9]
https://www.jstor.org/stable/2106141
[10]
[PDF] 1Diagnosing Sorites arguments* - Dialnet
ABSTRACT: This is a discussion of Delia Fara's theory of vagueness, and of its solution to the sorites paradox, criticizing.
[11]
[PDF] 1 Incoherentism and the Sorites Paradox Matti Eklund Uppsala ...
It is tolerance principles that underwrite the sorites paradox. Take a ... Since bivalence holds under each acceptable assignment, bivalence holds simpliciter.
[12]
[PDF] Three features of vague predicates: (a) borderline cases
a region of borderline cases of being bald (the so-called penumbra). • (ii) ... (c) Vague predicates are susceptible to sorites paradoxes: One hair cannot.
[13]
Why Higher-Order Vagueness is a Pseudo-Problem - jstor
The apparent lack of a sharp boundary to the predicate's extension is typically explained by the presence of border (borderline, or penumbral) cases for the.
[14]
Stephen Puryear, Frege on Vagueness and Ordinary Language
Frege supposedly believes that vague predicates have no referent (Bedeutung). But given other things he evidently believes, such a position would seem to ...
[15]
Marco Ruffino, Frege's view on vagueness - PhilPapers
The purpose of this paper is to discuss Frege's view on vagueness, and to draw some relevant consequences of it. By examining what exactly Frege has in mind ...
[16]
Vagueness - Book - SpringerLink
The Sorites Paradox · Front Matter. Pages 81-81. Download chapter PDF · The Paradox and the Incoherence Thesis. Linda Claire Burns · Reponses to the Paradox. Linda ...
[17]
[PDF] Philosophical and Jurisprudential Issues of Vagueness
Because the same kind of paradox can be generated using virtually any vague term, 'sorites paradox' has long been used in philosophy as a label for any paradox ...
[18]
Vagueness - 1st Edition - Timothy Williamson - Routledge Book
In stock Free deliveryTimothy Williamson traces the history of the problem of vagueness. He argues that standard logic and formal semantics apply even to vague languages.
[19]
[PDF] The Epistemicist Solution to the Sorites Paradox - Ofra Magidor
By far the most comprehensive defence of epistemicism is offered by Timothy Williamson, primarily in his book Vagueness (Williamson (1994)). In §2, I summarise ...Missing: primary | Show results with:primary
[20]
None
Below is a merged summary of the segments on Epistemicism and Higher-Order Vagueness Criticism, combining all the information from the provided summaries into a single, comprehensive response. To maximize detail and clarity, I will use a table in CSV format to organize the key points, followed by a narrative summary that integrates the remaining details and arguments. This approach ensures all information is retained while maintaining readability and density.
[21]
[PDF] Fine 1975
This paper began with the question "What is the correct logic of vague- ness?' This led to the further question 'What are the correct truth-condi-.
[22]
Paraconsistent Logic - Stanford Encyclopedia of Philosophy
Sep 24, 1996 · From the start, paraconsistent logics were intended in part to deal with problems of vagueness and the Sorites paradox (Jaśkowski 1948 [1969]).Dialetheism · Modern History of... · Motivations · Systems of Paraconsistent Logic
[23]
Degree Theory and the Sorites Paradox (Chapter 8)
Degree-theoretical approaches to vagueness attempt to flesh out the idea that properties referred to by vague predicates come in degrees, and that sentences ...<|separator|>
[24]
Dialetheism - Stanford Encyclopedia of Philosophy
Dec 4, 1998 · By adopting a paraconsistent logic, a dialetheist can countenance some contradictions without being thereby committed to countenancing ...
[25]
Many-Valued Logic - Stanford Encyclopedia of Philosophy
Apr 25, 2000 · Many-valued logic as a separate subject was created by the Polish logician and philosopher Łukasiewicz (1920), and developed first in Poland.Semantics · Systems of Many-Valued Logic · Applications of Many-Valued...
[26]
[PDF] Vagueness and Semantic Methodology - Mark Sainsbury
The data concerning reversal hysteresis are supposed to help explain why we think that the second premise of the “dynamic sorites paradox” is true, when in ...
[27]
(PDF) A Wittgensteinian Solution to the Sorites - Academia.edu
This paper seeks to resolve the Sorites paradox through a Wittgensteinian approach, exploring the nature of vagueness across various concepts, including 'heap' ...
[28]
[PDF] Transitivity, the Sorites Paradox, and Similarity-Based Decision ...
has taken it this large number of times, she would prefer to return to the situation in which she had never taken the action at all.
[29]
AI under great uncertainty: implications and decision strategies for ...
Sep 7, 2021 · John Danaher argues that the vague definition of AI is not necessarily an obstacle since there are other vague concepts ... AI ethics are also ...Uncertainty And Technology · Ai And Public Policy · Framing
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Vagueness and Law: Philosophical and Legal Perspectives
Dec 8, 2016 · It depicts how philosophers conceive vagueness in law from their theoretical perspective and how legal theorists make use of philosophical theories of ...