Translation principle for Dirac index

TL;DR

This paper establishes a translation principle for the Dirac index of certain modules related to real Lie groups, introduces an index polynomial linked to Weyl group representations, and explores its connections to character and Goldie rank polynomials.

Contribution

It introduces a new translation principle for the Dirac index, constructs an index polynomial for coherent families, and relates it to character and Goldie rank polynomials in representation theory.

Findings

Defined an index polynomial for coherent families of modules.

Showed the polynomial generates a Weyl group representation.

Conjectured a relationship between the index polynomial and associated cycle multiplicities.

Abstract

Let $G$ be a finite cover of a closed connected transpose-stable subgroup of $GL(n,\bR)$ with complexified Lie algebra $\frg$. Let $K$ be a maximal compact subgroup of $G$, and assume that $G$ and $K$ have equal rank. We prove a translation principle for the Dirac index of virtual $(\frg,K)$-modules. As a byproduct, to each coherent family of such modules, we attach a polynomial on the dual of the compact Cartan subalgebra of $\frg$. This ``index polynomial'' generates an irreducible representation of the Weyl group contained in the coherent continuation representation. We show that the index polynomial is the exact analogue on the compact Cartan subgroup of King's character polynomial. The character polynomial was defined in \cite{K1} on the maximally split Cartan subgroup, and it was shown to be equal to the Goldie rank polynomial up to a scalar multiple. In the case of representations of Gelfand-Kirillov dimension at most half the dimension of $G/K$, we also conjecture an explicit relationship between our index polynomial and the multiplicities of the irreducible components occuring in the associated cycle of the corresponding coherent family.