The Barnes-Hurwitz zeta cocycle at s=0 and Ehrhart quasi-polynomials of triangles

Abstract

Following a theorem of David R. Hayes, we give a geometric interpretation of the special value at s=0 of certain 1-cocycle on PGL2(Q) previously introduced by the author. This work yields three main results: an explicit formula for our cocycle at s=0, a generalization and a new proof of Hayes' theorem, and an elegant summation formula for the 0th coefficient of the Ehrhart quasi-polynomial of certain triangles in R2.

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