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Decomposition results for Gram matrix determinants

We study the Gram matrix determinants for the groups $S_n,O_n,B_n,H_n$, for their free versions $S_n^+,O_n^+,B_n^+,H_n^+$, and for the half-liberated versions $O_n^*,H_n^*$. We first collect all the known computations of such determinants, along with complete and simplified proofs, and with generalizations where needed. We conjecture that all these determinants decompose as $D=\prod_πϕ(π)$, with product over all associated partitions.

preprint2010arXivOpen access

Teodor Banica Stephen Curran

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Teodor Banica Stephen Curran

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Decomposition results for Gram matrix determinants

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