Typicality \`a la Russell in set theory

Abstract

We adjust the notion of typicality originated with Russell, which was introduced and studied in a previous paper for general first-order structures, to make it expressible in the language of set theory. The adopted definition of the class NT of nontypical sets comes out as a natural strengthening of Russell's initial definition, which employs properties of small (minority) extensions, when the latter are restricted to the various levels Vζ of V. This strengthening leads to defining NT as the class of sets that belong to some countable ordinal definable set. It follows that OD⊂eq NT and hence HOD⊂eq HNT. It is proved that the class HNT of hereditarily nontypical sets is an inner model of ZF. Moreover the (relative) consistency of V≠ NT is established, by showing that in many forcing extensions M[G] the generic set G is a typical element of M[G], a fact which is fully in accord with the intuitive meaning of typicality. In particular it is consistent that there exist continuum many typical reals. In addition it follows from a result of Kanovei and Lyubetsky that HOD≠ HNT is also relatively consistent. In particular it is consistent that P(ω) OD⊂neq P(ω) NT. However many questions remain open, among them the consistency of HOD≠ HNT≠ V, HOD= HNT≠ V and HOD≠ HNT= V.