📝 SummarXiv

Abstract

In the patching setting, given a factorization inverse system of fields over which patching for finite-dimensional vector spaces holds, together with a crossed module over the inverse limit field, the corresponding six-term Mayer--Vietoris sequence is constructed, generalizing the classical result of Harbater--Hartmann--Krashen for linear algebraic groups. When the crossed module is a two-term complex of tori, the above sequence is extended into a nine-term exact sequence, notably without any assumption on global domination of Galois cohomology of the inverse system. To this end, we develop a theory of (co-)flasque resolutions for short complexes of tori which is built on the work of Colliot-Th\'el\`ene and Sansuc. As an application, we show that patching holds for nonabelian second Galois cohomology of reductive groups with smooth centers. We also obtain a weak local--global principle for this cohomology set in the simply connected semisimple case.