Algebraic Shifting Increases Relative Homology
Abstract
[1]H#1 [1]β#1 k We show that algebraically shifting a pair of simplicial complexes weakly increases their relative homology Betti numbers in every dimension. More precisely, let (K) denote the algebraically shifted complex of simplicial complex K, and let j(K,L)= j(K,L;) be the dimension of the jth reduced relative homology group over a field of a pair of simplicial complexes L ⊂eq K. Then j(K,L) ≤ j((K),(L)) for all j. The theorem is motivated by somewhat similar results about Gr\"obner bases and generic initial ideals. Parts of the proof use Gr\"obner basis techniques.
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