Generalized K-theoretic invariants and wall-crossing via non-abelian localization

Abstract

Given an abelian category and a stability condition satisfying appropriate conditions, we define generalized K-theoretic invariants and prove that they satisfy wall-crossing formulas. For this, we introduce a new associative algebra structure on the K-homology of the stack of objects of an abelian category, which we call the K-Hall algebra. We first define δ-invariants directly coming from the stack of semistable objects and use the K-Hall algebra to take a formal logarithm and construct -invariants. We prove that these satisfy appropriate wall-crossing formulas using the non-abelian localization theorem. Based on work of Joyce in the cohomological setting, Liu had previously defined similar invariants assuming the existence of a framing functor; we show that when their definition of invariants makes sense it agrees with ours. Our results extend Joyce--Liu wall-crossing to non-standard hearts of Db(X), for which framing functors are not known to exist.

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