INDV 101: Philosophical Perspectives on the Individual David ...
Ontological Indeterminacy David J. Chalmers Metametaphysics Metaethics asks: What are we saying when we make ethical assertions? E.g. Such-and-such is good Do ethical assertions have a determinate truth-value? What determines the truth/status of ethical assertions? Metametaphysics asks: What are we saying when we make metaphysical assertions?
E.g. Such and such entities exist Do metaphysical assertions have a determinate truth-value? What determines the truth/status of metaphysical assertions? Ontological Questions The basic ontological question: What is there? Specific ontological questions: Are there numbers?
Yes: Platonists No: Nominalists Are there mereological sums of arbitrary objects? Always: Universalists Never: Nihilists Sometimes: Others Ontological Determinacy Q: Do these ontological questions have a determinate answer? Must one of (say) Platonism or nominalism be correct? Yes:
Quine Lewis, van Inwagen, Sider Most contemporary metaphysicians? No: Carnap Putnam, Hirsch, Yablo Many contemporary non-metaphysicians? Internal and External Questions Carnap, Empiricism, Semantics, and Ontology (1951) Existence questions always involve linguistic frameworks: e.g. the framework of mathematics, or of propositions. There are two sorts of existence questions.
Internal questions: questions of the existence of entities within a linguistic framework Are there any odd perfect numbers? Is there an apple on the table? External questions: questions concerning the existence of the frameworks system of entities as a whole Do numbers exist? Do ordinary physical objects exist? Internal and External Claims Carnap: Internal claims (answers to internal questions) are typically true or false
Their truth or falsity is framework-relative Their truth or falsity may be determined by the rules of the framework, plus experience (and/or?) the world. analytic (e.g. mathematical claims) empirical (e.g. claims about ordinary objects) External claims are neither true nor false The choice between frameworks is practical rather than factual Any further question is a pseudo-question, without cognitive content. A Carnapian Intuition
Question: Given that objects X and Y exist, does their sum exist? Carnapian intuition: Theres no deep further fact here. Once God fixed the facts about elements, how were further facts about mereological sums fixed? Once one knows about X and Y, one thereby knows everything relevant there is to know There isnt a further fact here of which one is ignorant One cant even conceive of two relevantly different states of affairs here. By a further decision (contingent truth?)
By conceptual necessity (analytic truth?) By pre-existing metaphysical necessity (brute metaphysical truth?) None of these options seem attractive. A Realist Intuition So-called external questions arent questions about language or about frameworks, but are straightforward questions about existence. x number (x) x y z z=sum(x, y) Sider, van Inwagen The predicates dont seem to be vague, and the rest is just first-order logic.
What part of dont you understand? Syracuses Most Holy Place My Project Ill try to: Set out a reasonably neutral framework in which to articulate the issues. Do some logical geography, distinguishing positions within this framework. State a deflationary (broadly Carnapian) position within the framework so set out. Defend a deflationary position against some realist considerations. Give a few positive details of the metaphysics and the semantics of a deflationary view. I wont try to:
Argue for the deflationary view at any length Articulate the full details of a deflationary metaphysics or semantics. Terminology Internal vs external questions is arguably suboptimal terminology It tends to suggest two different sorts of sentence, whereas the relevant distinction is between different uses of sentences (or perhaps, different evaluations of sentences). E.g. Prime numbers exist can intuitively be used/evaluated in both ways Same for Numbers exist and There are four prime numbers less than ten Also, internal/external presupposes the theoretical apparatus of frameworks
Is there a more neutral way to cast the distinction? Ordinary and Ontological Assertions Suggestion: we might instead distinguish ordinary and ontological assertions of existence sentences. Ordinary uses are typically made in ordinary first-order discussion of the relevant subject matter: E.g. a typical mathematicians assertion of There are four primes less than ten Ontological uses are typically made in broadly philosophical discussion where ontology matters
E.g. a typical philosophers assertion of Numbers exist. Ontological Sensitivity Key difference: For an important sort of utterance evaluation -- call it correctness The correctness of an ordinary assertion is insensitive (or at least, not obviously sensitive) to ontological matters The correctness of an ordinary assertion of There are infinitely many prime numbers is insensitive to whether Platonism or nominalism is true. The correctness of an ordinary assertion of There are two objects on the table is insensitive to whether nihilism/universalism/etc is true. The correctness of an ontological assertion is sensitive to ontological matters.
The correctness of an ontological assertion of There are infinitely many prime numbers is sensitive to whether Platonism or nominalism is true. The correctness of an ontological assertion of There are two objects on the table is sensitive to whether nihilism/universalism/etc is true. Correctness and ContextDependence Ill mostly remain neutral on whether correctness is the same as truth. My view: correctness is truth. i.e. the truth of ontological claims but not ordinary claims is sensitive to ontological matters. Alternative view: correctness is some other sort of success, such as acceptability or correctness of an implicated content or something else. On this view, the truth of ordinary assertions is ontologically sensitive, but their
correctness is not ontologically sensitive. Ill also mostly remain neutral on whether the difference between ontological and ordinary assertions is a matter of context-dependence, ambiguity, appropriate standards of evaluation, or some other form of semantic or pragmatic underdetermination. My view: its a sort of context-dependence. Neutrality of the Distinction Note that the distinction between ordinary and ontological assertions is relatively intuitive and pre-theoretical (though the correct gloss on it might be disputable). Realists can (and should!) accept the distinction. Revisionary Metaphysics Realists who endorse revisionary metaphysics (roughly, a view on which
correct ontology denies some claims of commonsense ontology) usually need the distinction. I.e. they need a sense in which ordinary assertions of a sentence S can be correct, even though [an ontological assertion of] S is strictly speaking false. Nominalists : There are an infinite number of primes. Nihilists: There are two apples on the table. Universalists: There are two objects on the table. Of course, different revisionary metaphysicians may give different theoretical accounts of correctness, e.g.
semantic or pragmatic analyzed via paraphrase, conditionals, quantifier restrictions, or something else. Descriptive Metaphysics Some realist descriptive metaphysicians (roughly, those who think that the correct ontology is commonsense ontology) may reject the distinction. But even a realist descriptive metaphysician can accept the difference between the two sorts of assertion: they will simply hold that corresponding ontological and ordinary assertions have the same correctness conditions. N.B. Two sorts of realist descriptive metaphysician (I) the coincidence between commonsense and correct ontology is a nontrivial fact about the world: ontological and ordinary assertions differ in cognitive significance, but it turns out that their correctness coincides.
(ii) the coincidence is a trivial fact: the only sense one can give to ontological assertions derives from commonsense ontology. Those of type (i) should clearly accept the distinction. Those of type (ii) might not. But type (ii) is already extremely close to a Carnapian position! Convergence on Correctness Proponents of very different ontological views (in our community) typically agree about judgments of correctness of ordinary assertions in specific circumstances. Platonists and nominalists agree on correctness of ordinary assertions (though not ontological assertions) of There are infinitely many primes. Nihilists, universalists, and so on agree on the correctness of an ordinary assertion (though not an ontological assertion) of There are two objects on the table. Roughly, correctness reflects ordinary judgments of truth in light of qualitative empirical facts and first-order reasoning, up to but not including distinctively ontological reasoning.
The commitments of unreflective commonsense ontology (e.g. to ordinary middlesized objects but not mereological sums) are relevant to the correctness of ordinary existence assertions, but the commitments of ontological theory are not. Relativity of Correctness? Correctness is tied to commonsense ontology. Different speakers or communities might have different commonsense ontologies. So is correctness speaker- or community-relative? Say that for Martians but not humans, commonsense ontology includes arbitrary mereological sums. Faced with two apples on a bare table, and asked How many objects are on the table, humans and Martians will usually make the following ordinary (N.B. not ontological) assertions: Human: There are two objects on the table Martian: There are three objects on the table.
Question: Which of these ordinary assertions is correct? The humans assertion is (presumably) correct. Is the Martians? Relativity of Correctness II Only two answers seem to be tenable: Both the human and the Martians assertions are correct. Correctness of ordinary assertions of existence claims depends on speakers context/community. The humans assertion is correct. The Martians assertion is incorrect, but its correct by Martian standards (its not h-correct, but its m-correct). There are multiple notions of correctness, possessed by different evaluators. Either way, there is a sort of relativism about correctness. There two assertions are on a par from
a Gods eye point-of-view, where standards in the vicinity of correctness are concerned. Do the human and the Martian have a substantive disagreement? Not simply in virtue of these assertions. Confronted with each other, they may well resolve it terminologically It depends on how you count objects. Lets say, there are two h-objects and three mobjects. No residual disagreement -- unless they have residual disagreements about substantive ontology (e.g., about whether m-objects really exist). Relativity of Truth? What about ontological assertions? Could their correctness (truth) be relative in a similar way? Consider an ontological disagreement between a nihilist and a universalist, faced with two particles in a vacuum chamber.
Nihilist: There are two objects in the chamber. Universalist: There are three objects in the chamber. Some Carnapians hold that this disagreement is terminological, e.g. by object the nihilist means n-object, and the universalist means u-object by there is an X the nihilist means there is a simple X, and the universalist means there are things arranged Xwise Relativity of Truth II I think the diagnosis of terminological disagreement is implausible. Unlike most such cases, the disagreement seems to persist as strongly as ever once the various allegedly ambiguous terms are distinguished:
Where apparent disagreement involving ordinary existence assertions is terminologically resolvable, apparent disagreement involving ontological existence assertions is not. So conflicting ontological assertions cannot both be correct. Are there really any m-objects? If there u-exists an X, does an X really exist? If so, the truth of ontological assertions is not relative. In ontological disagreement, there exists appears to express a common concept: the absolute quantifier. Lightweight and Heavyweight Quantification Ordinary existence assertions involve lightweight existential quantification I.e. their correctness can be analytic/conceptually necessary/trivial, or can be
analytically/apriori/trivially entailed by a claim without a corresponding existence assertion: There exists a perfect number If there are particles arranged chairwise, there is a chair. Ontological existence assertions arguably involve heavyweight existential quantification I.e. their truth is never analytic/conceptually necessary/trivial, and the only analytic/conceptually necessary/a priori conditionals with such claims as a consequent have corresponding existence assertions in the antecedent: If there exists an integer that is its divisor sum, there exists a perfect number. If there is an object with X and Y as parts and no other non-overlapping parts, then the mereological sum of X and Y exists Ontological Indeterminacy We can now state the core of a deflationary view:
The correctness of (at least some) ordinary existence assertions is relative (to speaker or just possibly to evaluator, or to the communities thereof). The truth of (at least some) absolute ontological existence assertions is indeterminate. N.B. even for existence assertions in which the non-existential vocabulary is unproblematic (non-indexical, precise, and so on). That is: the absolute existential quantifier can introduce relativity of correctness (for ordinary assertions) and indeterminacy of truth (for ontological assertions). Models, Worlds, and Domains
Q: How can this be? Isnt the absolute unrestricted existential quantifier a logical notion? A: Yes. But logic only tells us how to evaluate a quantified statement in a model. For truth, we need to evaluate a quantified statement in a world. A world is not a model! A model comes with a built-in domain A world may not come with a built-in domain Absolute Domains The absolute quantifier requires an absolute domain for its evaluation. Ontological realist: The world has an associated absolute domain
Ontological deflationist: The world does not have an associated absolute domain. The deflationist might see the indeterminacy of absolute quantification as a sort of presupposition failure (or: maybe not) Absolutely quantified assertions presuppose that there is an absolute domain. But there is no such domain: the world lacks the requisite structure. Creation Myth In creating the world, God created a universe, or a wavefunction, or some stuff, or some particles, and/or some minds Once God fixed the facts about the basis, how could further facts about e.g. the absolute existence of mereological sums be fixed?
That was all God needed to do. There was no need to decide whether chairs or tables exist, or whether mereological sums exist. By a further decision (contingent truth?) No. Any facts here supervene. By conceptual necessity (analytic truth?) No. Incompatible with heavyweight quantifier. By pre-existing metaphysical necessity (brute metaphysical truth?) No. What could ground brute laws of metaphysics (that bind even God)? So these facts arent fixed at all. At best, there may be absolute existential truths about the fundamental domain. Lightweight Deflationism
A related deflationary view (Hirsch): Ontological existence assertions are not indeterminate, but their truth-value reflects folk ontology. On this view, all quantification is lightweight quantification. Both deflationist views agree that (alleged) absolute quantification is in some way defective: Lightweight deflationist: There is no such concept. (Or: the concept is incoherent?) Heavyweight deflationist: There is a concept of absolute quantification (the one involved in some ontological disagreements), but it imposes demands that the world cannot meet.
Arguably: the views agree about ontology, and about much of meta-ontology, with just a disagreement about the existence of certain concepts. Lightweight Realism Some other ontologists hold that ontological quantification is lightweight: Lewis, Jackson, Thomasson: Its conceptually necessary that when A and B exist, their mereological sum exists Hale & Wright: Its analytic that if there is a bijection from the Fs to the Gs, there exists a number that is the number of the Fs and the Gs. Quine: Its trivial that when science says X exists, X exists? One might call this sort of view lightweight realism Truth-value of ontological statements is held to be determinate and non-relative But these views will presumably reject the coherence of heavyweight quantification
In some respects the view is closer to deflationism than to heavyweight realism There are still no determinately true heavyweight existence assertions From a Carnapian viewpoint, these views privilege one conceptual framework as special Ordinary Existence Assertions Challenge: If there is no absolute domain, how do we analyze the truth-conditions (or correctness-conditions) of existence assertions, including ordinary existence assertions. One answer: modify the semantics so that their correctness doesnt involve a domain Cant handle them merely by domain restriction. E.g. Various nominalist/nihilist strategies
Another answer: supply a domain! Instead of invoking (context- or community-relative) domain restriction, well invoke (context- or community-relative) domain determination. Furnished Worlds Lets say a furnished world is an ordered pair of a world and a domain. Take an ersatz view of worlds and domains Worlds are sets of sentences about fundamental entities and properties. Domains are classes of singular terms (including descriptions) in canonical language (or: classes of equivalence classes of singular terms) (perhaps along with some non-singular terms and associated cardinalities)
The members of the domain are (or represent) the entities in that furnished world. Furnishing Functions A domain-determination function, or furnishing function, is a mapping from worlds to domains Intuitively, mapping a world to the class of singular terms that refer to entities taken to exist in that world (for a given standard of existence) A world and a furnishing function jointly determine an furnished world Only some furnishing functions are admissible A world and an admissible furnishing function determine an admissible
furnished world. Truth in Furnished Worlds Hypothesis: Predicates (or uses thereof) determine a function from furnished worlds to classes of entities in the domain of that furnished world Likewise for relational terms, general terms, singular terms, etc. So non-quantified sentences (or utterances) determine a function from furnished worlds to truth-values. Then use standard semantics for evaluating an existentially quantified sentence (or utterance) at an furnished world Its true if the corresponding open sentence is true of some entity in the domain.
Ordinary Existence Assertions Suggestion: E.g. our folk ontology yields a furnishing function Every ordinary context of utterance involves/determines an (admissible) furnishing function f An ordinary utterance is correct at a world W iff it is true at the furnished world Typical ordinary existence assertions are true iff true at the corresponding furnished world Folk ontologies in other communities yield a different furnishing function.
E.g. nihilist, universalist, van-Inwagen-esque furnishing functions. Ontological Existence Assertions Q: Can we use this apparatus to analyze (heavyweight) ontological existence assertions? Perhaps: absolute quantification determines an indeterminate domain. Or perhaps: appeal to supervaluation An absolutely quantified assertion is true at a world W iff for all admissible furnishing functions f, it is true at the furnished world . It is false at W iff for all admissible f, it is false at the furnished world .
Else it is indeterminate at W. Questions Lots of big residual questions: (1) What is it for a furnishing function to be admissible? (2) How does context/community determine a furnishing function? (3) Can furnishing functions mix within a single utterance? (4) Does the appeal to classes, functions, sentences in the semantics create a circularity problem?
(5) Are there (pragmatically? philosophically?) distinguished furnishing functions? (6) Is there a concept of absolute quantification? (7) Conclusion
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