Abstract
Baxter (Australas J Philos 79:449–464, 2001) proposes an ingenious solution to the problem of instantiation based on his theory of cross-count identity. His idea is that where a particular instantiates a universal it shares an aspect with that universal. Both the particular and the universal are numerically identical with the shared aspect in different counts. Although Baxter does not say exactly what a count is, it appears that he takes ways of counting as mysterious primitives against which different numerical identities are defined. In contrast, I defend the idea—suggested, though not quite endorsed, by Baxter himself—that counts are independent dimensions of numerical identity. Different ways of counting are explained by the existence of these different sorts of identity (i.e., counts). For the instantiation of a universal by a particular, I propose one dimension concerned with the individuation of particulars (the p-count) and another dimension concerned with the individuation of universals (the u-count). On that basis, I give a clear definition of cross-count identity that explains its asymmetrical nature (i.e., the fact that particulars instantiate universals, but not vice versa). I extend the theory to a third dimension—that of time, or the t-count—and thereby defend Baxter’s ideas on change, and the contingency of instantiation. Baxter (Mind 97(388):575–582, 1988; Australas J Philos 79:449–464, 2001) proposes the related idea of composition as (cross-count) identity. Parts are individually cross-count identical with the wholes that they constitute, and they collectively share all aspects across counts with those wholes. I propose an innovation by which totality is shared distinctness across counts. The theory applies to both the totality of particulars that instantiate any given universal, and the totality of parts that constitute any given whole. I argue that this has several advantages over Armstrong’s view, which is based on a dubious external totalling relation. I also argue that Armstrong’s theory of numbers (or quantities) as internal relations ought to be rejected in favour of an account based on identity and distinctness. The paper concludes with a careful analysis of external relations in Baxter’s framework. I argue that we must recognise one further dimension of identity in order to differentiate between, e.g., the aspects of Abelard insofar as he loves Heloise and Abelard insofar as he loves Isobel. Each of these aspects is identical with Abelard and identical with loving-by, yet they must be in some way distinct. I therefore propose the r-count, in which multiple distinct relational properties are the very same relation (-part). The existence of these four independent dimensions explains the fact that particulars, universals, relations, and times are fundamentally different sorts of things in the ontology. Each is individuated with respect to a different dimension of identity.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Notes
Baxter informs me that he “would rather say that numerical identity is relative to two different ways of counting, than that there are two sorts of numerical identity” (p.c.). I propose that the best way to account for these mind-independent and objective ways of counting, and the existence of aspects, is in terms of multiple sorts of numerical identity (which is to say counts, as I define them).
What makes cross-count identity a case of identity (rather than something else) is that it consists in nothing but the conjunction of identities. It is numerical identity in the sense that the identities involved are strict. I prefer the term ‘strict’ over ‘numerical’, because—if Baxter is right—something may be one in one count/dimension, and many in another, so to assume absolute numerical identity may beg the question against cross-count identity. Cross-count identity could be considered a complex strict identity.
I am grateful to Josep Macià for alerting me to the fact that two (p- and u-distinct) aspects may be symmetrically cross-count identical. Given aspects A, B, C, D such that A is u-identical with B, C is u-identical with D, A is p-identical with C and B is p-identical with D, it follows that A is cross-count identical with D and D is cross-count identical with A—hence that A and D are symmetrically cross-count identical.
A forthcoming paper from Baxter makes the proposal directly.
What Baxter calls “partial cross-count identity” I call ‘cross-count identity’. What Baxter calls “cross-count identity” I call ‘full cross-count identity’. I maintain this different terminology, despite the possibility of confusion, because (partial) cross-count identity is the basic, primitive form. To understand full cross-count identity, we need to add an account of totality.
This is because, prima facie, there may be distinct necessary co-existents.
I make essential use of the notion of internal distinctness in the account of numbers in Sect. 6.
The following is inspired by a personal communication from Baxter, stating that he had in mind “an account of fission and fusion that makes the identity of particulars contingent”.
Since these were the only aspects of a 1 and a 2, respectively, I assume that the particulars themselves go out of existence too.
Such properties “determine a unit”, unlike properties such as being red and being smooth (Armstrong 1997, p. 189).
One could equally, of course, have shown the planes of two particulars or two universals. The r-count is not a privileged dimension. A full three-dimensional grid would perhaps be a better representation, but it would be harder to read. One can imagine stacking several of these planes to get the desired effect. The “vertical” dimension is then that of r-identity and r-distinctness (the r-count).
Note, however, that under the sort of version of Baxter’s theory that Armstrong prefers, in which cross-count identity is necessary, a further dimension of identity would in fact support the co-necessitation. Nevertheless, the cost incurred is rather high if particulars and universals cannot be counted as identical with themselves over time.
References
Armstrong, D. M. (1997). A world of states of affairs. Cambridge: Cambridge University Press.
Armstrong, D. M. (2004). Truth and truthmakers. Cambridge: Cambridge University Press.
Baxter, D. L. M. (1988). Identity in the loose and popular sense. Mind, 97(388), 575–582.
Baxter, D. L. M. (2001). Instantiation as partial identity. Australasian Journal of Philosophy, 79, 449–464.
Kim, J. (1993). Supervenience and mind. Cambridge: Cambridge University Press.
Lewis, D. (1991). Parts of classes. Oxford: Basil Blackwell.
Link, G. (1998). Algebraic semantics in language and philosophy. Stanford, CA: CSLI Publications.
Author information
Authors and Affiliations
Corresponding author
Additional information
Thanks to Donald Baxter, Ronnie Cann, Josep Macià, Josefa Toribio, and the anonymous reviewers for so many invaluable suggestions, comments, and criticisms.
Rights and permissions
About this article
Cite this article
Underwood, I. Cross-count identity, distinctness, and the theory of internal and external relations. Philos Stud 151, 265–283 (2010). https://doi.org/10.1007/s11098-009-9446-y
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11098-009-9446-y