Indeterminate Jacobi operators II

Abstract

We consider the Jacobi operator (T,D(T)) associated with an indeterminate Hamburger moment problem, and present countable subsets S of the domain D(T) such that span(S) is dense in 2. As an example we have S=(pn(u))+B(u)(pn(0)):D(u)=0, where (pn) denotes the orthonormal polynomials of the moment problem and B,D are two of the Nevanlinna functions. It is also proved that sets like S are optimal in the sense that if one vector is removed, then the span is no longer dense.

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