Stably free modules and the unstable classification of 2-complexes
Abstract
For all k 2, we show that there exists a group G and a non-free stably free Z G-module of rank k. We use this to show that, for all k 2, there exist homotopically distinct finite 2-complexes with fundamental group G and with Euler characteristic exceeding the minimal value over G by k. This resolves Problem D5 in the 1979 Problem List of C. T. C. Wall. We also explore a number of generalisations and present a potential application to the topology of closed smooth 4-manifolds.
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