On the Betti Numbers of Chessboard Complexes |
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Authors: | Joel Friedman Phil Hanlon |
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Affiliation: | (1) Department of Mathematics, University of British Columbia, Vancouver, BC, V6T 1Z2, Canada;(2) Department of Mathematics, University of Michigan, Ann Arbor, MI, 48109–1003 |
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Abstract: | In this paper we study the Betti numbers of a type of simplicial complex known as a chessboard complex. We obtain a formula for their Betti numbers as a sum of terms involving partitions. This formula allows us to determine which is the first nonvanishing Betti number (aside from the 0-th Betti number). We can therefore settle certain cases of a conjecture of Björner, Lovász, Vreica, and ivaljevi in [2]. Our formula also shows that all eigenvalues of the Laplacians of the simplicial complexes are integers, and it gives a formula (involving partitions) for the multiplicities of the eigenvalues. |
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Keywords: | chessboard complex Laplacian symmetric group representation connectivity Betti number |
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