Geometrical Aspects of Functional Analysis
Geometrical Aspects of Functional Analysis Israel Seminar, 1985–86 / [electronic resource] :
edited by Joram Lindenstrauss, Vitali D. Milman.
- VI, 212 p. online resource.
- Lecture Notes in Mathematics, 1267 0075-8434 ; .
- Lecture Notes in Mathematics, 1267 .
Monotonicity of the volume of intersection of balls -- On lattice packing of convex symmetric sets in ?n -- Diameter of a minimal invariant subset of equivariant lipschitz actions on compact subsets of ? k -- The relation between the distance and the weak distance for spaces with a symmetric basis -- Complements of subspaces of ? p n ; p ?1 which are uniquely determined -- Embedding X p m spaces into ? r n -- Some remarks on Urysohn's inequality and volume ratio of cotype 2-spaces -- On the covering numbers of convex bodies -- On a theorem of J. Bourgain on finite dimensional decompositions and the radon-nikodym property -- Sudakov type inequalities for convex bodies in IR n -- An application of infinite dimensional holomorphy to the geometry of banach spaces -- A density condition for analyticity of the restriction algebra -- Remarks on the extension of lipschitz maps defined on discrete sets and uniform homeomorphisms -- On dimension free maximal inequalities for convex symmetric bodies in ?n -- On lipschitz embedding of finite metric spaces in low dimensional normed spaces -- Random series in the real interpolation spaces between the spaces v p -- Cotype of the spaces (A 0, A 1)?1.
These are the proceedings of the Israel Seminar on the Geometric Aspects of Functional Analysis (GAFA) which was held between October 1985 and June 1986. The main emphasis of the seminar was on the study of the geometry of Banach spaces and in particular the study of convex sets in and infinite-dimensional spaces. The greater part of the volume is made up of original research papers; a few of the papers are expository in nature. Together, they reflect the wide scope of the problems studied at present in the framework of the geometry of Banach spaces.
9783540477716
10.1007/BFb0078130 doi
Global analysis (Mathematics).
Analysis.
QA299.6-433
515
Monotonicity of the volume of intersection of balls -- On lattice packing of convex symmetric sets in ?n -- Diameter of a minimal invariant subset of equivariant lipschitz actions on compact subsets of ? k -- The relation between the distance and the weak distance for spaces with a symmetric basis -- Complements of subspaces of ? p n ; p ?1 which are uniquely determined -- Embedding X p m spaces into ? r n -- Some remarks on Urysohn's inequality and volume ratio of cotype 2-spaces -- On the covering numbers of convex bodies -- On a theorem of J. Bourgain on finite dimensional decompositions and the radon-nikodym property -- Sudakov type inequalities for convex bodies in IR n -- An application of infinite dimensional holomorphy to the geometry of banach spaces -- A density condition for analyticity of the restriction algebra -- Remarks on the extension of lipschitz maps defined on discrete sets and uniform homeomorphisms -- On dimension free maximal inequalities for convex symmetric bodies in ?n -- On lipschitz embedding of finite metric spaces in low dimensional normed spaces -- Random series in the real interpolation spaces between the spaces v p -- Cotype of the spaces (A 0, A 1)?1.
These are the proceedings of the Israel Seminar on the Geometric Aspects of Functional Analysis (GAFA) which was held between October 1985 and June 1986. The main emphasis of the seminar was on the study of the geometry of Banach spaces and in particular the study of convex sets in and infinite-dimensional spaces. The greater part of the volume is made up of original research papers; a few of the papers are expository in nature. Together, they reflect the wide scope of the problems studied at present in the framework of the geometry of Banach spaces.
9783540477716
10.1007/BFb0078130 doi
Global analysis (Mathematics).
Analysis.
QA299.6-433
515