Mirabolic Hecke algebras, Schur-Weyl duality and Frobenius character formulas

Abstract

We first introduce a new presentation for the mirabolic Hecke algebra Hn,R(q) over an arbitrary commutative ring R and derive a new basis. Based on this presentation, specializing to the case of Hn(q) over the field C(q), we construct a basis for the cocenter of Hn(q), which facilitates the definition of its character table. We further establish a Schur--Weyl duality between Hn(q) and the quantum group Uq(glr). As an application, we obtain Frobenius character formulas for the irreducible characters of Hn(q) within the ring of symmetric functions. Finally, we derive a recursive Murnaghan--Nakayama rule for the computation of the character table.