Kleber's conjecture and complementary products of symmetric functions

Abstract

We prove Kleber's rectangular-complement conjecture for Schur functions over an arbitrary commutative ring R, showing that, for a fixed rectangle, the products sλsλ, indexed by unordered complementary pairs, are linearly independent in ΛR. The proof rests on a general independence theorem for componentwise splittings, which asserts that for every partition θ, the products sαsβ are linearly independent as \α,β\ ranges over unordered pairs of partitions satisfying α+β=θ. The independence of the products sλsλ also yields linear independence of the Koike--Terada universal-character products over any field, answering a question of Gao--Orelowitz--Yong. We also prove the analogous result for monomial symmetric functions over fields of characteristic zero, as well as integral linear independence over Z.

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