English

Elementary symmetric polynomials in Stanley--Reisner face ring

Algebraic Topology 2016-03-01 v1 Commutative Algebra Combinatorics

Abstract

Let PP be a simple polytope of dimension nn with mm facets. In this paper we pay our attention on those elementary symmetric polynomials in the Stanley--Reisner face ring of PP and study how the decomposability of the nn-th elementary symmetric polynomial influences on the combinatorics of PP and the topology and geometry of toric spaces over PP. We give algebraic criterions of detecting the decomposability of PP and determining when PP is nn-colorable in terms of the nn-th elementary symmetric polynomial. In addition, we define the Stanley--Reisner {\em exterior} face ring E(KP)\mathcal{E}(K_P) of PP, which is non-commutative in the case of Z{\Bbb Z} coefficients, where KPK_P is the boundary complex of dual of PP. Then we obtain a criterion for the (real) Buchstaber invariant of PP to be mnm-n in terms of the nn-th elementary symmetric polynomial in E(KP)\mathcal{E}(K_P). Our results as above can directly associate with the topology and geometry of toric spaces over PP. In particular, we show that the decomposability of the nn-th elementary symmetric polynomial in E(KP)\mathcal{E}(K_P) with Z{\Bbb Z} coefficients can detect the existence of the almost complex structures of quasitoric manifolds over PP, and if the (real) Buchstaber invariant of PP is mnm-n, then there exists an essential relation between the nn-th equivariant characteristic class of the (real) moment-angle manifold over PP in E(KP)\mathcal{E}(K_P) and the characteristic functions of PP.

Keywords

Cite

@article{arxiv.1602.08837,
  title  = {Elementary symmetric polynomials in Stanley--Reisner face ring},
  author = {Zhi Lü and Jun Ma and Yi Sun},
  journal= {arXiv preprint arXiv:1602.08837},
  year   = {2016}
}

Comments

19 pages, 3 pictures

R2 v1 2026-06-22T12:59:39.227Z