On the x-y Symmetry of Correlators in Topological Recursion via Loop Insertion Operator

Abstract

Topological Recursion generates a family of symmetric differential forms (correlators) from some initial data (,x,y,B). We give a functional relation between the correlators of genus g=0 generated by the initial data (,x,y,B) and by the initial data (,y,x,B), where x and y are interchanged. The functional relation is derived with the loop insertion operator by computing a functional relation for some intermediate correlators. Additionally, we show that our result is equivalent to the recent result of Borot:2021thu in case of g=0. Consequently, we are providing a simplified functional relation between generating series of higher order free cumulants and moments in higher order free probability.