An operator that relates to semi-meander polynomials via a two-sided q-Wick formula

Abstract

We consider the sequence ( Qn )n=1∞ of semi-meander polynomials which are used in the enumeration of semi-meandric systems (a family of diagrams related to the classical stamp-folding problem). We show that for a fixed natural number d, the sequence ( Qn (d) )n=1∞ appears as sequence of moments for a compactly supported probability measure d on the real line. More generally, we consider a two-variable generalization Qn (t,u) of Qn(t), which is related to a natural concept of "self-intersecting meandric system"; the second variable of Qn (t,u) keeps track of the crossings of such a system (and one has, in particular, that Qn (t,0) is the original semi-meander polynomial Qn (t)). We prove that for a fixed natural number d and a fixed real number q with |q| < 1, the sequence ( Qn (d,q) )n=1∞ appears as sequence of moments for a compactly supported probability measure d:q on the real line. The measure d;q is found as scalar spectral measure for an operator Td;q constructed by using left and right creation/annihilation operators on a q-deformation of the full Fock space introduced by Bozejko and Speicher. The relevant calculations of moments for Td;q are made by using a two-sided version of a (previously studied in the one-sided case) q-Wick formula, which involves the number of crossings of a pair-partition.