Inversion formula with hypergeometric polynomials and its application to an integral equation

Abstract

For any complex parameters x and , we provide a new class of linear inversion formulas T = A(x,) · S S = B(x,) · T between sequences S = (Sn)n ∈ N* and T = (Tn)n ∈ N*, where the infinite lower-triangular matrix A(x,) and its inverse B(x,) involve Hypergeometric polynomials F(·), namely \ arrayll An,k(x,) = (-1)knkF(k-n,-n;-n;x), \\ Bn,k(x,) = (-1)knkF(k-n,k;k;x) array . for 1 ≤slant k ≤slant n. Functional relations between the ordinary (resp. exponential) generating functions of the related sequences S and T are also given. These new inversion formulas have been initially motivated by the resolution of an integral equation recently appeared in the field of Queuing Theory; we apply them to the full resolution of this integral equation. Finally, matrices involving generalized Laguerre polynomials polynomials are discussed as specific cases of our general inversion scheme.