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＜電子ブック＞
Geometric Aspects of Functional Analysis : Israel Seminar 2004-2005 / edited by Vitali D. Milman, Gideon Schechtman
(Lecture Notes in Mathematics. ISSN:16179692 ; 1910)

版	1st ed. 2007.
出版者	(Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer)
出版年	2007
本文言語	英語
大きさ	VIII, 332 p : online resource
著者標目	Milman, Vitali D editor Schechtman, Gideon editor SpringerLink (Online service)
件　名	LCSH:Functional analysis LCSH:Convex geometry  LCSH:Discrete geometry LCSH:Probabilities FREE:Functional Analysis FREE:Convex and Discrete Geometry FREE:Probability Theory
一般注記	Theory of Valuations on Manifolds, IV. New Properties of the Multiplicative Structure -- Geometric Applications of Chernoff-Type Estimates -- A Remark on the Surface Brunn–Minkowski-Type Inequality -- On Isoperimetric Constants for Log-Concave Probability Distributions -- A Remark on Quantum Ergodicity for CAT Maps -- Some Arithmetical Applications of the Sum-Product Theorems in Finite Fields -- On the Maximal Number of Facets of 0/1 Polytopes -- A Note on an Observation of G. Schechtman -- Marginals of Geometric Inequalities -- Deviation Inequalities on Largest Eigenvalues -- On the Euclidean Metric Entropy of Convex Bodies -- Some Remarks on Transportation Cost and Related Inequalities -- A Comment on the Low-Dimensional Busemann–Petty Problem -- Random Convex Bodies Lacking Symmetric Projections, Revisited Through Decoupling -- The Random Version of Dvoretzky's Theorem in -- Tail-Sensitive Gaussian Asymptotics for Marginals of Concentrated Measures in High Dimension -- Decoupling Weakly Dependent Events -- The Square Negative Correlation Property for Generalized Orlicz Balls This collection of original papers related to the Israeli GAFA seminar (on Geometric Aspects of Functional Analysis) during the years 2004-2005 follows the long tradition of the previous volumes that reflect the general trends of the Theory and are a source of inspiration for research. Most of the papers deal with different aspects of the Asymptotic Geometric Analysis, ranging from classical topics in the geometry of convex bodies, to inequalities involving volumes of such bodies or, more generally, log-concave measures, to the study of sections or projections of convex bodies. In many of the papers Probability Theory plays an important role; in some limit laws for measures associated with convex bodies, resembling Central Limit Theorems, are derive and in others probabilistic tools are used extensively. There are also papers on related subjects, including a survey on the behavior of the largest eigenvalue of random matrices and some topics in Number Theory HTTP:URL=https://doi.org/10.1007/978-3-540-72053-9

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