The equivariant Hilbert series of the canonical ring of Fermat curves

Abstract

We consider a Fermat curve Fn:xn+yn+zn=1 over an algebraically closed field k of characteristic p≥0 and study the action of the automorphism group G=(Z/nZ×Z/nZ) S3 on the canonical ring R= H0(Fn,Fn m) when p>3, p n and n-1 is not a power of p. In particular, we explicitly determine the classes [H0(Fn,Fn m)] in the Grothendieck group K0(G,k) of finitely generated k[G]-modules, describe the respective equivariant Hilbert series HR,G(t) as a rational function, and use our results to write a program in Sage that computes HR,G(t) for an arbitrary Fermat curve.