2-adic valuations of certain ratios of products of factorials and applications
Abstract
We prove the conjecture of Falikman--Friedland--Loewy on the parity of the degrees of projective varieties of n× n complex symmetric matrices of rank at most k. We also characterize the parity of the degrees of projective varieties of n× n complex skew symmetric matrices of rank at most 2p. We give recursive relations which determine the parity of the degrees of projective varieties of m× n complex matrices of rank at most k. In the case the degrees of these varieties are odd, we characterize the minimal dimensions of subspaces of n× n skew symmetric real matrices and of m× n real matrices containing a nonzero matrix of rank at most k. The parity questions studied here are also of combinatorial interest since they concern the parity of the number of plane partitions contained in a given box, on the one hand, and the parity of the number of symplectic tableaux of rectangular shape, on the other hand.
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