Multiplicity free induction for the pairs (GL2×GL2,diag(GL2)) and (SL3,GL2) over finite fields

Abstract

We classify the irredible representations of GL2(q) for which the induction to the product group GL2(q)×GL2(q), under the diagonal embedding, decomposes multiplicity free. It turns out that only the irreducible representations of dimensions 1 and q-1 have this property. We show that for GL2(q) embedded into SL3(q) via g(g, g-1) none of the irreducible representations of GL2(q) induce multiplicity free. In contrast, over the complex numbers, the holomorphic representation theory of these pairs is multiplicity free and the corresponding matrix coefficients are encoded by vector-valued Jacobi polynomials. We show that similar results cannot be expected in the context of finite fields for these examples.