K1(Var) is presented by stratified birational equivalences

Abstract

This paper provides a complete presentation of K1(Var), the K1 group of varieties, resolving and simplifying a problem left open in ZakhK1. Our approach adapts Gillet-Grayson's G-Construction to define an un-delooped K-theory spectrum of varieties. There are two levels on which one can read the present paper. On a technical level, we streamline and extend previous results on the K-theory of exact categories to a broader class of categories, including Var. On a more conceptual level, our investigations bring into focus an interesting generalisation of automorphisms (``double exact squares'') which generate K1. For varieties, this corresponds to what we call stratified birational equivalences, but the construction extends to a wide range of non-additive contexts (e.g. o-minimal structures, definable sets etc.). This raises a challenging question: what kind of information do these generalised automorphisms calibrate?

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