The Hilbert Series of the Irreducible Quotient of the Polynomial Representation of the Rational Cherednik Algebra of Type An-1 in Characteristic p for p|n-1

Abstract

We study the irreducible quotient Lt,c of the polynomial representation of the rational Cherednik algebra Ht,c(Sn,h) of type An-1 over an algebraically closed field of positive characteristic p where p|n-1. In the t=0 case, for all c 0 we give a complete description of the polynomials in the maximal proper graded submodule B, the kernel of the contravariant form B, and subsequently find the Hilbert series of the irreducible quotient L0,c. In the t=1 case, we give a complete description of the polynomials in B when the characteristic p=2 and c is transcendental over F2, and compute the Hilbert series of the irreducible quotient L1,c. In doing so, we prove a conjecture due to Etingof and Rains completely for p=2, and also for any t=0 and n 1p. Furthermore, for t=1, we prove a simple criterion to determine whether a given polynomial f lies in B for all n=kp+r with r and p fixed.