Coefficients of Catalan States of Lattice Crossing II: Applications of A-state Expansions

Abstract

Plucking polynomial of a plane rooted tree with a delay function α was introduced in 2014 by J.H.~Przytycki. As shown in this paper, plucking polynomial factors when α satisfies additional conditions. We use this result and A-state expansion introduced in our previous work to derive new properties of coefficients C(A) of Catalan states C resulting from an m × n-lattice crossing L(m,n). In particular, we show that C(A) factors when C has arcs with some special properties. In many instances, this yields a more efficient way for computing C(A). As an application, we give closed-form formulas for coefficients of Catalan states of L(m,3).