Orthogonality of invariant vectors

Abstract

Let G be a finite group with given subgroups H and K. Let π be an irreducible complex representation of G such that its space of H-invariant vectors as well as the space of K-invariant vectors are both one dimensional. Let vH (resp. vK) denote an H-invariant (resp. K-invariant) vector of unit norm in the standard G-invariant inner product ~,~ π on π. Our interest is in computing the square of the absolute value of vH,vK π. This is the correlation constant c(π;H,K) defined by Gross. In this paper, we give a sufficient condition for vH, vK π to be zero and a sufficient condition for it to be non-zero (i.e., H and K are correlated with respect to π), when G= GL2( Fq), where Fq is the finite field of q=pf elements of odd characteristic p, H is its split torus and K is a non-split torus. The key idea in our proof is to analyse the mod p reduction of π. We give an explicit formula for | vH,vK π|2 modulo p. Finally, we study the behaviour of vH,vK π under the Shintani base change and give a sufficient condition for vH,vK π to vanish for an irreducible representation π= BC(τ) of PGL2( E), in terms of the epsilon factor of the base changing representation τ of PGL2( F), where E/ F is a finite extension of finite fields. This is reminiscent of the vanishing of L(1/2, BC(τ)), in the theory of automorphic forms, when the global root number of τ is -1.

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