Polynomials from combinatorial $K$-theory
Abstract
We introduce two new bases of the ring of polynomials and study their relations to known bases. The first basis is the quasiLascoux basis, which is simultaneously both a -theoretic deformation of the quasikey basis and also a lift of the -analogue of the quasiSchur basis from quasisymmetric polynomials to general polynomials. We give positive expansions of this quasiLascoux basis into the glide and Lascoux atom bases, as well as a positive expansion of the Lascoux basis into the quasiLascoux basis. As a special case, these expansions give the first proof that the -analogues of quasiSchur polynomials expand positively in multifundamental quasisymmetric polynomials of T. Lam and P. Pylyavskyy. The second new basis is the kaon basis, a -theoretic deformation of the fundamental particle basis. We give positive expansions of the glide and Lascoux atom bases into this kaon basis. Throughout, we explore how the relationships among these -analogues mirror the relationships among their cohomological counterparts. We make several 'alternating sum' conjectures that are suggestive of Euler characteristic calculations.
Cite
@article{arxiv.1806.03802,
title = {Polynomials from combinatorial $K$-theory},
author = {Cara Monical and Oliver Pechenik and Dominic Searles},
journal= {arXiv preprint arXiv:1806.03802},
year = {2021}
}
Comments
35 pages, 10 figures