Higher Specht polynomials under the diagonal action

Abstract

We introduce higher Specht polynomials - analogs of Specht polynomials in higher degrees - in two sets of variables x1,…,xn and y1,…,yn under the diagonal action of the symmetric group Sn. This generalizes the classical Specht polynomial construction in one set of variables, as well as the higher Specht basis for the coinvariant ring Rn due to Ariki, Terasoma, and Yamada, which has the advantage of respecting the decomposition into irreducibles. As our main application of the general theory, we provide a higher Specht basis for the hook shape Garsia--Haiman modules. In the process, we obtain a new formula for their doubly graded Frobenius series in terms of new generalized cocharge statistics on tableaux.