English

Polynomials from combinatorial $K$-theory

Combinatorics 2021-01-20 v1

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 KK-theoretic deformation of the quasikey basis and also a lift of the KK-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 KK-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 KK-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 KK-analogues mirror the relationships among their cohomological counterparts. We make several 'alternating sum' conjectures that are suggestive of Euler characteristic calculations.

Keywords

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

R2 v1 2026-06-23T02:25:22.721Z