Open Problems in the Geometry and Analysis of Banach Spaces

Authors: Guirao, Antonio J., Montesinos, Vicente, Zizler, Václav
Provides an invaluable survey of open problems for mathematicians developing MSc and PhD theses in Banach space theory
Presents a selection of open problems, encompassing the longstanding as well as the recent; the general and the more localized
Includes a comprehensive index listing featured problems by subject, concept, and symbols

This is an collection of some easily-formulated problems that remain open in the study of the geometry and analysis of Banach spaces. 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 and biorthogonal systems, fixed points, topology and nonlinear geometry.
The main purpose of this work is to help in convincing young researchers in Functional Analysis that the theory of Banach spaces is a fertile field of research, full of interesting open problems. Inside the Banach space area, the text should help expose young researchers to the depth and breadth of the work that remains, and to provide the perspective necessary to choose a direction for further study.

Some of the problems are longstanding open problems, some are recent, some are more important and some are only local problems. Some would require new ideas, some may be resolved with only a subtle combination of known facts. Regardless of their origin or longevity, each of these problems documents the need for further research in this area.

Number of Illustrations and Tables
1 b/w illustrations
Topics
Functional Analysis
Approximations and Expansions
Measure and Integration
Convex and Discrete Geometry
Algebraic Topology



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