Multiplication Operators between Lipschitz-Type Spaces on a Tree

Multiplication Operators between Lipschitz-Type Spaces on a Tree

Let ℒ be the space of complex-valued functions 𝑓 on the set of vertices 𝑇 of an 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...

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Main Authors: Robert F. Allen, Flavia Colonna, Glenn R. Easley
Format: Article
Language:English
Published: Hindawi Limited 2011-01-01
Series:International Journal of Mathematics and Mathematical Sciences
Online Access:http://dx.doi.org/10.1155/2011/472495
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spelling doaj-abe72966bbd1467d8bf9392f46645c422020-11-24T23:45:13ZengHindawi LimitedInternational Journal of Mathematics and Mathematical Sciences0161-17121687-04252011-01-01201110.1155/2011/472495472495Multiplication Operators between Lipschitz-Type Spaces on a TreeRobert F. Allen0Flavia Colonna1Glenn R. Easley2Department of Mathematics, University of Wisconsin-La Crosse, La Crosse, WI 54601, USADepartment of Mathematical Sciences, George Mason University, Fairfax, VA 22030, USASystem Planning Corporation, Arlington, VA 22209, USALet ℒ be the space of complex-valued functions 𝑓 on the set of vertices 𝑇 of an 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 paper, 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.http://dx.doi.org/10.1155/2011/472495
collection DOAJ
language English
format Article
sources DOAJ
author Robert F. Allen
Flavia Colonna
Glenn R. Easley
spellingShingle Robert F. Allen
Flavia Colonna
Glenn R. Easley
Multiplication Operators between Lipschitz-Type Spaces on a Tree
International Journal of Mathematics and Mathematical Sciences
author_facet Robert F. Allen
Flavia Colonna
Glenn R. Easley
author_sort Robert F. Allen
title Multiplication Operators between Lipschitz-Type Spaces on a Tree
title_short Multiplication Operators between Lipschitz-Type Spaces on a Tree
title_full Multiplication Operators between Lipschitz-Type Spaces on a Tree
title_fullStr Multiplication Operators between Lipschitz-Type Spaces on a Tree
title_full_unstemmed Multiplication Operators between Lipschitz-Type Spaces on a Tree
title_sort multiplication operators between lipschitz-type spaces on a tree
publisher Hindawi Limited
series International Journal of Mathematics and Mathematical Sciences
issn 0161-1712
1687-0425
publishDate 2011-01-01
description Let ℒ be the space of complex-valued functions 𝑓 on the set of vertices 𝑇 of an 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 paper, 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.
url http://dx.doi.org/10.1155/2011/472495
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AT flaviacolonna multiplicationoperatorsbetweenlipschitztypespacesonatree
AT glennreasley multiplicationoperatorsbetweenlipschitztypespacesonatree
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