Dens, nests and the Loehr-Warrington conjecture

Abstract

In a companion paper, we introduced raising operator series called Catalanimals. Among them are Schur Catalanimals, which represent Schur functions inside copies (Xm,n)⊂ E of the algebra of symmetric functions embedded in the elliptic Hall algebra E of Burban and Schiffmann. Here we obtain a combinatorial formula for symmetric functions given by a class of Catalanimals that includes the Schur Catalanimals. Our formula is expressed as a weighted sum of LLT polynomials, with terms indexed by configurations of nested lattice paths called nests, having endpoints and bounding constraints controlled by data called a den. Applied to Schur Catalanimals for the alphabets Xm,1 with n=1, our `nests in a den' formula proves the combinatorial formula conjectured by Loehr and Warrington for ∇m sμ as a weighted sum of LLT polynomials indexed by systems of nested Dyck paths. When n is arbitrary, our formula establishes an (m,n) version of the Loehr-Warrington conjecture. In the case where each nest consists of a single lattice path, the nests in a den formula reduces to our previous shuffle theorem for paths under any line. Both this and the (m,n) Loehr-Warrington formula generalize the (km,kn) shuffle theorem proven by Carlsson and Mellit (for n=1) and Mellit. Our formula here unifies these two generalizations.

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