Motivic pieces of curves: L-functions and periods

Abstract

Given a curve C over a number field K equipped with the action of a finite group G by K-automorphisms, one obtains a factorisation of L(C,s) into a product of L-functions of `motivic pieces of curves' associated to irreducible G-representations. We describe an algorithm for explicitly computing values of these L-functions, demonstrating implementations in the cases of certain curves with actions by C3, C4 and D10. We explain how this algorithm can be used to factor L-functions of curves with endomorphisms of Hecke type. Towards applications, we explicitly formulate and numerically verify a version of Deligne's Period Conjecture for hitherto-uninvestigated L-functions arising from motivic pieces of superelliptic curves.