Lipschitz-free Spaces on Finite Metric Spaces
Lipschitz-free Spaces on Finite Metric Spaces
About this item
Full title
Lipschitz-free Spaces on Finite Metric Spaces
Author / Creator
Publisher
Toronto: Cambridge University Press
Journal title
Canadian journal of mathematics, 2020-06, Vol.72 (3), p.774-804
Language
English
Formats
Publication information
Publisher
Toronto: Cambridge University Press
Subjects
More information
Scope and Contents
Contents
Main results of the paper are as follows:
(1) For any finite metric space
$M$
the Lipschitz-free space on
$M$
contains a large well-complemented subspace that is close to
$\ell _{1}^{n}$
.
(2) Lipschitz-free spaces on large classes of recursively defined sequences of graphs are not uniformly isomorphic to
$\ell _{1}^{n}$<...
Alternative Titles
Full title
Lipschitz-free Spaces on Finite Metric Spaces
Authors, Artists and Contributors
Author / Creator
Identifiers
Primary Identifiers
Record Identifier
TN_cdi_proquest_journals_2402266360
Permalink
https://devfeature-collection.sl.nsw.gov.au/record/TN_cdi_proquest_journals_2402266360
Other Identifiers
ISSN
0008-414X
E-ISSN
1496-4279
DOI
10.4153/S0008414X19000087
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