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We wish to point out how certain concepts in commutative algebra are of value in studying combinatorial properties of simplicial complexes. In particular, we obtain new restrictions on the /-vectors of simplicial convex polytopes. Let A be a finite simplicial complex with vertex set V = vl, v2, vn. We call the elements of A the faces of A. If the largest face of A has d elements, then we say dim A = d- 1. The f-vector of A is (fo f\\ # * * »/*-i) where dim A = d- 1 and exactly ft faces of A have i + 1 elements. Define for positive integers m9 d-1 H (A, m) =j: fifr-A Also define H (A, 0) = 1. We say that A is constructible 2 if it can be obtained by the following recursive procedure: (a) Every simplex is constructible, and (b) if A and A are constructible of the same dimension d, and if A n A is constructible of dimension d- 1, then A U A is constructible. We know of two main classes of constructible As: (A) The boundary complex of a simplicial convex polytope is constructible. This follows from 1. (B) Let D be a finite distributive lattice, and let D be D with the top element and bottom element removed. Let A be the simplicial complex whose faces are the chains of D. Then A is constructible. If h and i are positive integers, then h can be written uniquely in the form
Richard P. Stanley (Wed,) studied this question.
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