Catalan Moments

Abstract

This paper is essentially devoted to the study of some interesting relations among the well known operators I(x) (the interpolated Invert), L(x) (the interpolated Binomial) and Revert (that we call η). We prove that I(x) and L(x) are conjugated in the group (R). Here R is a commutative unitary ring. In the same group we see that η transforms I(x) in L(-x) by conjugation. These facts are proved as corollaries of much more general results. Then we carefully analyze the action of these operators on the set R of second order linear recurrent sequences. While I(x) and L(x) transform R in itself, η sends R in the set of moment sequences μn(h,k) of particular families of orthogonal polynomials, whose weight functions are explicitly computed. The moments come out to be generalized Motzkin numbers (if R=, the Motzkin numbers are μn(-1,1)). We give several interesting expressions of μn(h,k) in closed forms, and one recurrence relation. There is a fundamental sequence of moments, that generates all the other ones, μn(0,k). These moments are strongly related with Catalan numbers. This fact allows us to find, in the final part, a new identity on Catalan numbers by using orthogonality relations.