Some Indeterminate Moment Problems and Freud-Like Weights

We consider some indeterminate moment problems which all have a discrete solution concentrated on geometric progressions of the form cq k, k E 7/ or ± cq k, k E ~-. It turns out to be possible that such a moment problem has infinitely many solutions concentrated on the geometric progression.

We show that there exist indeterminate Stieltjes moment problems with prescribed common logarithmic order and type.

Let { n } ∞ n=1 be a sequence of points in the open unit disk in the complex plane and let . We put L = span{B n : n = 0, 1, 2, . . .} and we consider the following "moment" problem: Given a positive-definite Hermitian inner product •, • in L, find all positive Borel measures on [-, ) such that We

We consider the problem of vanishing of the moments m k (P , q) = Ω P k (x)q(x) dμ(x) = 0, k = 1, 2, . . . , with Ω a compact domain in R n and P (x), q(x) complex polynomials in x ∈ Ω (MVP). The main stress is on relations of this general vanishing problem to the following conjecture which has been

A bisequence of complex numbers {pLn}Ea determines a strong moment functional Y satisfying Y[x"] =pL,. If \_Y is positive-definite on a bounded interval (a,b) c Iw\{O}, then 44 has an integral representation 6P[xn]=~~\_xn d$(x), n = 0, f 1,312,. ., and quadrature rules {w,i, x,,} exist such that ,,&