DOI: 10.5802/alco.495 ISSN: 2589-5486

A Littlewood-type identity for Robbins polynomials

Ilse Fischer, Hans Höngesberg

We provide a generalization of the Littlewood identity, both sides of which are related to alternating sign matrices. The classical Littlewood identity establishes a nice product formula for the sum of all Schur polynomials. Compared to the classical identity, Schur polynomials are replaced by so-called modified Robbins polynomials . These polynomials are a generalization of Schur polynomials and enumerate down-arrowed monotone triangles , and thus also alternating sign matrices. As an additional factor on the other side of the identity, we have a Pfaffian formula which we interpret in terms of the partition function of six-vertex model configurations corresponding to diagonally symmetric alternating sign matrices .

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