Rigidity and the Lower Bound Theorem for Doubly Cohen-Macaulay Complexes
Abstract
We prove that for d≥ 3, the 1-skeleton of any (d-1)-dimensional doubly Cohen Macaulay (abbreviated 2-CM) complex is generically d-rigid. This implies the following two corollaries (by Kalai and Lee respectively): Barnette's lower bound inequalities for boundary complexes of simplicial polytopes hold for every 2-CM complex (of dimension ≥ 2). Moreover, the initial part (g0,g1,g2) of the g-vector of a 2-CM complex (of dimension ≥ 3) is an M-sequence. It was conjectured by Bj\"orner and Swartz that the entire g-vector of a 2-CM complex is an M-sequence.
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