Reflection length with two parameters in the asymptotic representation theory of type B/C and applications

TL;DR

This paper introduces a two-parameter reflection length function for the hyperoctahedral group, classifies its positive definiteness, constructs related representations, and applies these to develop a type B cyclic Fock space with new Gaussian operators.

Contribution

It provides a two-parameter refinement of reflection length, classifies extreme characters, and constructs a type B cyclic Fock space with applications to Gaussian operators and distributions.

Findings

The two-parameter reflection function is positive definite iff it is an extreme character.

Constructed representations via a tensor product action generalizing Schur--Weyl.

Developed a type B cyclic Fock space and related Gaussian operators.

Abstract

We introduce a two-parameter function $\phi_{q_+,q_-}$ on the infinite hyperoctahedral group, which is a bivariate refinement of the reflection length keeping track of the long and the short reflections separately. We show that this signed reflection function $\phi_{q_+,q_-}$ is positive definite if and only if it is an extreme character of the infinite hyperoctahedral group and we classify the corresponding set of parameters $q_+,q_-$. We construct the corresponding representations through a natural action of the hyperoctahedral group $B(n)$ on the tensor product of $n$ copies of a vector space, which gives a two-parameter analog of the classical construction of Schur--Weyl. We apply our classification to construct a cyclic Fock space of type B generalizing the one-parameter construction in type A found previously by Bo\.zejko and Guta. We also construct a new Gaussian operator acting on the cyclic Fock space of type B and we relate its moments with the Askey--Wimp--Kerov distribution by using the notion of cycles on pair-partitions, which we introduce here. Finally, we explain how to solve the analogous problem for the Coxeter groups of type D by using our main result.