On certain non-unique solutions of the Stieltjes moment problem

Abstract

We construct explicit solutions of a number of Stieltjes moment problems based on moments of the form 1(r)(n)=(2rn)! and 2(r)(n)=[(rn)!]2, r=1,2,..., n=0,1,2,..., i.e. we find functions W(r)1,2(x)>0 satisfying ∫0∞xnW(r)1,2(x)dx = 1,2(r)(n). It is shown using criteria for uniqueness and non-uniqueness (Carleman, Krein, Berg, Pakes, Stoyanov) that for r>1 both 1,2(r)(n) give rise to non-unique solutions. Examples of such solutions are constructed using the technique of the inverse Mellin transform supplemented by a Mellin convolution. We outline a general method of generating non-unique solutions for moment problems generalizing 1,2(r)(n), such as the product 1(r)(n)·2(r)(n) and [(rn)!]p, p=3,4,....