The f- and h-vectors of Interval Subdivisions
Abstract
The interval subdivision Int() of a simplicial complex was introduced by Walker. We give the complete combinatorial description of the entries of the transformation matrices from the f- and h-vectors of to the f- and h-vectors of Int(). We show that if has non-negative h-vector then the h-polynomial of its interval subdivision has only real roots. As a consequence, we prove the Charney-Davis conjecture for Int(), if has non-negative reciprocal h-vector.
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