Chromatic numbers, Buchstaber numbers and chordality of Bier spheres
Abstract
We describe all the Bier spheres of dimension d with chromatic number equal to d+1 and prove that all other d-dimensional Bier spheres have chromatic number equal to d+2, for any integer d≥ 0. Then we prove a general formula for complex and mod p Buchstaber numbers of a Bier sphere Bier(K), for each prime p∈N in terms of the f-vector of the underlying simplicial complex K. Finally, we classify all chordal Bier spheres and obtain their canonical realizations as boundaries of stacked polytopes.
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