论文信息 - A non-commutative version of Jacobi's equality on the cofactors of a matrix

A non-commutative version of Jacobi's equality on the cofactors of a matrix

Abstract We give a combinatorial proof of Jacobi's equality relating a cofactor of a matrix with the complementary cofactor of its inverse. This result unifies two previous approaches of the combinatorial interpretation of determinants: generating functions of weighted permutations and generating functions of families (configurations) of non-crossing paths. We show that Jacobi's equality is valid with the same choice of non-commutative entries as in Foata's proof of matrix inversion by cofactors.

Pierre Lalonde | P. Lalonde

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