Vertex decomposability and weakly polymatroidal ideals

Abstract

Let K be a field and R=K[x1,…, xn] be the polynomial ring in n variables over a field K. Let be a simplicial complex on n vertices and I=I be its Stanley-Reisner ideal. In this paper, we show that if I is a matroidal ideal then the following conditions are equivalent: (i) is sequentially Cohen-Macaulay; (ii) is shellable; (iii) is vertex decomposable. Also, if I is a minimally generated by u1,…,us such that s≤ 3 or supp(ui) supp(uj)=\x1,…,xn\ for all i≠ j, then is vertex decomposable. Furthermore, we prove that if I is a monomial ideal of degree 2 then I is weakly polymatroidal if and only if I has linear quotients if and only if I is vertex splittable.