Harmonic Bergman spaces on locally finite trees
Abstract
We define the harmonic Bergman space on locally finite trees with respect to a suitable probabilistic Laplacian and a class of weighted flow measures. We characterise the corresponding Bergman projection and prove that it is bounded on Lp for every p>1, and of weak type (1,1). We also prove necessary and sufficient conditions for the Lp-boundedness of the extension of a class of Toeplitz-type operators.
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