Agnieszka M. Kazun, Ryszard Szwarc
Published 2009-03-20, updated 2009-07-09Version 2
Symmetric Jacobi matrices on one sided homogeneous trees are studied. Essential selfadjointness of these matrices turns out to depend on the structure of the tree. If a tree has one end and infinitely many origin points the matrix is always essentially selfadjoint independently of the growth of its coefficients. In case a tree has one origin and infinitely many ends, the essential selfadjointness is equivalent to that of an ordinary Jacobi matrix obtained by the restriction to the so called radial functions. For nonselfadjoint matrices the defect spaces are described in terms of the Poisson kernel associated with the boundary of the tree.
Approximating Continuous Functions with Scattered Translates of the Poisson Kernel
Estimates for the Poisson kernel and the evolution kernel on nilpotent meta-abelian groups
Recovery of bivariate band limited functions using scattered translates of the Poisson kernel
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