This thesis deals with the descriptive set theory and the geometry of banach spaces. The number p is a real number with 1 1, and orthogonal in l2. All talks in section of geometry of banach spaces take place in room n 122. Search for geometry of linear 2 normed spaces books in the search form now, download or read books for free, just by creating an account to enter our library. More than 1 million books in pdf, epub, mobi, tuebl and audiobook formats. This book introduces the reader to linear functional analysis and to related parts of infinitedimensional banach space theory. Godefroykalton 2003 let xand ybe separable banach spaces and suppose that f. Equivariant geometry of banach spaces and topological groups. Basic concepts in the geometry of banach spaces william b. Banach space theory the basis for linear and nonlinear. Open problems in the geometry and analysis of banach spaces. Basic concepts in the geometry of banach spaces, in. The two main concepts here are solvent maps and geometric gelfand pairs.
Nevertheless, several weaker questions remain open. Hilbert space banach space vector space basic concept. Each of the twenty one articles in this volume after the basic concepts chapter is devoted to one specific direction of banach space theory or its applications. It is very well written and contains a lot of results and techniques from these two theories, and thus may serve as a reference book. Handbook of the geometry of banach spaces handbook of. Volume ii will present a thorough study of the basic randomisation techniques and the operatortheoretic aspects of the theory, such as r. It is in the core of the basic results on the geometry of hilbert. Also, some of the more specialized concepts of current interest in banach space. In this chapter we introduce basic notions and concepts in banach space theory. Fundaments of the geometric theory of banach spaces. Handbook of the geometry of banach spaces volume 2 1st edition. The author uses descriptive set theory to prove results on the structure of banach spaces. A schauder basis in a banach space x is a sequence e n n.
Topological open problems in the geometry of banach spaces. Canadian mathematical society societe mathematique du canada. A good concise reference for the basics of banach space theory is 67 or we refer to the appendices of 16. Open problems in the geometry and analysis of banach. This is an collection of some easilyformulated problems that remain open in the study of the geometry and analysis of banach spaces.
As a rule we will work with real scalars, only in a few instances, e. The uptodate surveys, authored by leading research workers in the area, are written to be accessible to a wide audience. Hilbert space banach space vector space basic concept orthonormal basis. Geometric concepts such as dentability, uniform smoothness, uniform convexity, beck convexity, etc. First, a map x y between metric spaces is solvent if, for every. Assuming the reader has a working familiarity with the basic results of banach space theory, the authors focus on concepts of basic linear geometry, convexity, approximation, optimization, differentiability, renormings, weak compact generating, schauder bases. Functional analysis and infinitedimensional geometry.
A short course on non linear geometry of banach spaces 3 we nish this very short section by mentioning an important recent result by g. Y is an into isometry, then xis linearly isometric to a subspace of y. Geometry and martingales in banach spaces 1st edition. Equivariant geometry of banach spaces and topological groups 3 as it turns out, naor 46 was recently able to answer our question in the negative, namely, there are separable banach spaces x and e and a bornologous map between them which is not close to any uniformly continuous map. Firstly a very important class of spaces which are infinite dimensional ver. Each article contains a motivated introduction as well as an exposition of the main results, methods, and open. Functional analysis and infinitedimensional geometry pp 5 cite as. Handbook of the geometry of banach spaces the handbook presents an overview of most aspects of modern banach space theory and its applications. Volumes of convex bodies and banach space geometry tomczak, jaegerman. A banach space is a normed linear space x, ii 11 that is complete in the canonical. All talks in section of geometric topology take place in room n 123. Banach spaces with a schauder basis are necessarily separable, because the countable set of finite linear combinations with rational coefficients say is dense.
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