Multiplication operators between Lipschitz-type spaces on a tree

Abstract

Let L be the space of complex-valued functions f on the set of vertices T of an rooted infinite tree rooted at o such that the difference of the values of f at neighboring vertices remains bounded throughout the tree, and let Lw be the set of functions f∈ L such that |f(v)-f(v-)|=O(|v|-1), where |v| is the distance between o and v and v- is the neighbor of v closest to o. In this article, we characterize the bounded and the compact multiplication operators between L and Lw, and provide operator norm and essential norm estimates. Furthermore, we characterize the bounded and compact multiplication operators between Lw and the space L∞ of bounded functions on T and determine their operator norm and their essential norm. We establish that there are no isometries among the multiplication operators between these spaces.

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