The definable content of homological invariants I: Ext & lim1

Abstract

This is the first installment in a series of papers in which we illustrate how classical invariants of homological algebra and algebraic topology can be enriched with additional descriptive set-theoretic information. To effect this enrichment, we show that many of these invariants can be naturally regarded as functors to the category, introduced herein, of groups with a Polish cover. The resulting definable invariants provide far stronger means of classification. In the present work we focus on the first derived functors of Hom(-,-) and lim(-). The resulting definable Ext(B,F) for pairs of countable abelian groups B,F and definable lim1(A) for towers A of Polish abelian groups substantially refine their classical counterparts. We show, for example, that the definable Ext(-,Z) is a fully faithful contravariant functor from the category of finite rank torsion-free abelian groups with no free summands; this contrasts with the fact that there are uncountably many non-isomorphic such groups with isomorphic classical invariants Ext(,Z) . To facilitate our analysis, we introduce a general Ulam stability framework for groups with a Polish cover and we prove several rigidity results for non-Archimedean abelian groups with a Polish cover. A special case of our main result answers a question of Kanovei and Reeken regarding quotients of the p-adic groups. Finally, using cocycle superrigidity methods for profinite actions of property (T) groups, we obtain a hierarchy of complexity degrees for the problem R(Aut()(,Z)) of classifying all group extensions of by Z up to base-free isomorphism, when =Z[1/p]d for prime numbers p and d≥ 1.