Geometric Aspects of Functional Analysis
Editat de Vitali D. Milman, Gideon Schechtmanen Limba Engleză Paperback – 7 mar 2003
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Specificații
ISBN-13: 9783540004851
ISBN-10: 3540004858
Pagini: 444
Ilustrații: VIII, 432 p.
Dimensiuni: 155 x 235 x 24 mm
Greutate: 0.67 kg
Ediția:2003
Editura: Springer
Locul publicării:Berlin, Heidelberg, Germany
ISBN-10: 3540004858
Pagini: 444
Ilustrații: VIII, 432 p.
Dimensiuni: 155 x 235 x 24 mm
Greutate: 0.67 kg
Ediția:2003
Editura: Springer
Locul publicării:Berlin, Heidelberg, Germany
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Public țintă
ResearchCuprins
Preface.- F. Barthe, M. Csörnyei and A. Naor: A Note on Simultaneous Polar and Cartesian Decomposition.- A. Barvinok: Approximating a Norm by a Polynomial.- S.G. Bobkov: Concentration of Distributions of the Weighted Sums with Bernoullian Coefficients.- S.G. Bobkov: Spectral Gap and Concentration for Some Spherically Symmetric Probability Measures.- S.G. Bobkov and A. Koldobsky: On the Central Limit Property of Convex Bodies.- S.G. Bobkov and F.L. Nazarov: On Convex Bodies and Log-Concave Probability Measures with Unconditional Basis.- J. Bourgain: Random Lattice Schrödinger Operators with Decaying Potential: Some Higher Dimensional Phenomena.- J. Bourgain: On Long-Time Behaviour of Solutions of Linear Schrödinger Equations with Smooth Time-Dependent Potential.- J. Bourgain: On the Isotropy-Constant Problem for 'PSI-2'-Bodies.- E.D. Gluskin: On the Sum of Intervals.- E. Gluskin and V. Milman: Note on the Geometric-Arithmetic Mean Inequality.- O. Guédon and A. Zvavitch: Supremum of a Process in Terms of Trees.- O. Maleva: Point Preimages under Ball Non-Collapsing Mappings.- V. Milman and R. Wagner: Some Remarks on a Lemma of Ran Raz.- F. Nazarov: On the Maximal Perimeter of a Convex Set in R^n with Respect to a Gaussian Measure.- K. Oleszkiewicz: On p-Pseudostable Random Variables, Rosenthal Spaces and l_p^n Ball Slicing.- G. Paouris: Psi_2-Estimates for Linear Functionals on Zonoids.- G. Schechtman, N. Tomczak-Jaegermann and R. Vershynin: Maximal l_p^n-Structures in Spaces with Extremal Parameters.- C. Schütt and E. Werner: Polytopes with Vertices Chosen Randomly from the Boundary of a Convex Body.- Seminar Talks (with Related Workshop and Conference Talks).
Caracteristici
Includes supplementary material: sn.pub/extras
Textul de pe ultima copertă
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.
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.