A basis for the Diagonal Harmonic Alternants
Abstract
It will be shown here that there are differential operators and for each , acting on Diagonal Harmonics, yielding that is a representation of (see [3] Chapter 3). Our main effort here is to use theory to predict a basis for the Diagonal Harmonic Alternants, . It can be shown that the irreducible representations are all of the form , with and . The polynomial is known to be called a "String Starter". From theory it follows that is a direct sum of strings. Our main result so far is a formula for the number of string starters. A recent paper by Carlsson and Oblomkov (see [2]) constructs a basis for the space of Diagonal Coinvariants by Algebraic Geometrical tools. It would be interesting to see if any our results can be derived from theirs.
Keywords
Cite
@article{arxiv.2204.01812,
title = {A basis for the Diagonal Harmonic Alternants},
author = {Adriano Garsia and Mike Zabrocki},
journal= {arXiv preprint arXiv:2204.01812},
year = {2022}
}
Comments
12 pages, 7 figures