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Asymptotic theory of finite dimensional normed spaces

Vol. 1200 of the LNM series deals with the geometrical structure of finite dimensional normed spaces. One of the main topics is the estimation of the dimensions of euclidean and l^n p spaces which nicely embed into diverse finite-dimensional normed spaces. An essential method here is the concentrati...

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Detalles Bibliográficos
Autores principales: Milman, Vitali D, Schechtman, Gideon
Lenguaje:eng
Publicado: Springer 1986
Materias:
Acceso en línea:https://dx.doi.org/10.1007/978-3-540-38822-7
http://cds.cern.ch/record/1691080
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author Milman, Vitali D
Schechtman, Gideon
author_facet Milman, Vitali D
Schechtman, Gideon
author_sort Milman, Vitali D
collection CERN
description Vol. 1200 of the LNM series deals with the geometrical structure of finite dimensional normed spaces. One of the main topics is the estimation of the dimensions of euclidean and l^n p spaces which nicely embed into diverse finite-dimensional normed spaces. An essential method here is the concentration of measure phenomenon which is closely related to large deviation inequalities in Probability on the one hand, and to isoperimetric inequalities in Geometry on the other. The book contains also an appendix, written by M. Gromov, which is an introduction to isoperimetric inequalities on riemannian manifolds. Only basic knowledge of Functional Analysis and Probability is expected of the reader. The book can be used (and was used by the authors) as a text for a first or second graduate course. The methods used here have been useful also in areas other than Functional Analysis (notably, Combinatorics).
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spelling cern-16910802021-04-21T21:11:34Zdoi:10.1007/978-3-540-38822-7http://cds.cern.ch/record/1691080engMilman, Vitali DSchechtman, GideonAsymptotic theory of finite dimensional normed spacesMathematical Physics and MathematicsVol. 1200 of the LNM series deals with the geometrical structure of finite dimensional normed spaces. One of the main topics is the estimation of the dimensions of euclidean and l^n p spaces which nicely embed into diverse finite-dimensional normed spaces. An essential method here is the concentration of measure phenomenon which is closely related to large deviation inequalities in Probability on the one hand, and to isoperimetric inequalities in Geometry on the other. The book contains also an appendix, written by M. Gromov, which is an introduction to isoperimetric inequalities on riemannian manifolds. Only basic knowledge of Functional Analysis and Probability is expected of the reader. The book can be used (and was used by the authors) as a text for a first or second graduate course. The methods used here have been useful also in areas other than Functional Analysis (notably, Combinatorics).Springeroai:cds.cern.ch:16910801986
spellingShingle Mathematical Physics and Mathematics
Milman, Vitali D
Schechtman, Gideon
Asymptotic theory of finite dimensional normed spaces
title Asymptotic theory of finite dimensional normed spaces
title_full Asymptotic theory of finite dimensional normed spaces
title_fullStr Asymptotic theory of finite dimensional normed spaces
title_full_unstemmed Asymptotic theory of finite dimensional normed spaces
title_short Asymptotic theory of finite dimensional normed spaces
title_sort asymptotic theory of finite dimensional normed spaces
topic Mathematical Physics and Mathematics
url https://dx.doi.org/10.1007/978-3-540-38822-7
http://cds.cern.ch/record/1691080
work_keys_str_mv AT milmanvitalid asymptotictheoryoffinitedimensionalnormedspaces
AT schechtmangideon asymptotictheoryoffinitedimensionalnormedspaces