The Galois Structure of the Spaces of polydifferentials on the Drinfeld Curve

Abstract

Let C be a smooth projective curve over an algebraically closed field F equipped with the action of a finite group G. When p =char(F) divides the order of G, the long-standing problem of computing the induced representation of G on the space H0(C,Ω mC) of globally holomorphic polydifferentials remains unsolved in general. In this paper, we study the case of the group G = SL2(Fq) (where q is a power of~p) acting on the Drinfeld curve C which is the projective plane curve given by the equation XYq-XqY-Zq+1 = 0. When q = p, we fully decompose H0(C,Ω mC) as a direct sum of indecomposable F[G]-modules. For arbitrary q, we give a partial decomposition in terms of an explicit F-basis of H0(C,Ω mC). Finally, in the appendix, we compute the a-number and p-rank of the Drinfeld curve.