Curves are algebraic K(π,1): theoretical and practical aspects

Abstract

We prove that any geometrically connected curve X over a field k is an algebraic K(π,1), as soon as its geometric irreducible components have nonzero genus. This means that the cohomology of any locally constant constructible \'etale sheaf of Z/nZ-modules, with n invertible in k, is canonically isomorphic to the cohomology of its corresponding π1(X)-module. To this end, we explicitly construct some Galois coverings of X corresponding to Galois coverings of the normalisation of its irreducible components. When k is finite or separably closed, we explicitly describe finite quotients of π1(X) that allow to compute the cohomology groups of the sheaf, and give explicit descriptions of the cup products H1× H1 H2 and H1× H2 H3 in terms of finite group cohomology.