A proof of the 4-variable Catalan polynomial of the Delta conjecture

Abstract

In The Delta Conjecture (arxiv:1509.07058), Haglund, Remmel and Wilson introduced a four variable q,t,z,w Catalan polynomial, so named because the specialization of this polynomial at the values (q,t,z,w) = (1,1,0,0) is equal to the Catalan number 1n+12nn. We prove the compositional version of this conjecture (which implies the non-compositional version) that states that the coefficient of sr,1n-r in the expression h ∇ Cα is equal to a weighted sum over decorated Dyck paths.