On the genera of semisimple groups defined over an integral domain of a global function field

Abstract

Let K=Fq(C) be the global function field of rational functions over a smooth and projective curve C defined over a finite field Fq. The ring of regular functions on C-S where S ≠ is any finite set of closed points on C is a Dedekind domain OS of K. For a semisimple OS-group G with a smooth fundamental group F, we aim to describe both the set of genera of G and its principal genus (the latter if G OS K is isotropic at S) in terms of abelian groups depending on OS and F only. This leads to a necessary and sufficient condition for the Hasse local-global principle to hold for certain G. We also use it to express the Tamagawa number τ(G) of a semisimple K-group G by the Euler Poincar\'e invariant. This facilitates the computation of τ(G) for twisted K-groups.