# Kostka functions associated to complex reflection groups and a   conjecture of Finkelberg-Ionov

**Authors:** Toshiaki Shoji

arXiv: 1702.02711 · 2017-06-28

## TL;DR

This paper proves a conjecture by Finkelberg and Ionov that their defined Kostka functions coincide with the negative variant of Kostka functions associated to complex reflection groups, and explores multi-variable extensions.

## Contribution

The paper confirms Finkelberg and Ionov's conjecture linking their Kostka functions to existing ones and discusses multi-variable generalizations.

## Key findings

- Finkelberg-Ionov conjecture is proven to hold.
- Kostka functions are extended to multi-variable versions.
- Results connect Kostka functions with Lusztig's partition function.

## Abstract

Kostka functions $K^{\pm}_{\lambda, \mu}(t)$ associated to complex reflection groups are a generalization of Kostka polynomials, which are indexed by $r$-partitions $\lambda, \mu$ and a sign $+, -$. It is known that Kostka polynomials have an interpretation in terms of Lusztig's partition function. Finkelberg and Ionov defined alternate functions $K_{\lambda,\mu}(t)$ by using an analogue of Lusztig's partition function, and showed that $K_{\lambda,\mu}(t)$ are polynomials in $t$ with non-negative integer coefficients. They conjecture that their $K_{\lambda,\mu}(t)$ coincide with $K^-_{\lambda,\mu}(t)$. In this paper, we show that their conjecture holds. We also discuss a multi-variable version of Kostka functions.

## Full text

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## References

12 references — full list in the complete paper: https://tomesphere.com/paper/1702.02711/full.md

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Source: https://tomesphere.com/paper/1702.02711