Biorthogonal Systems in Banach Spaces

One of the fundamental questions of Banach space theory is whether every Banach space has a basis. A space with a basis gives us a sense of familiarity and concreteness, and perhaps a chance to attempt the classification of all Banach spaces and other problems.

The main goals of this book are to: -introduce the reader to some of the basic concepts, results and applications of biorthogonal systems in infinite dimensional geometry of Banach spaces, and in topology and nonlinear analysis in Banach spaces, -aim the text at graduate students and researchers who have a foundation in Banach space theory, - expose the reader to some current avenues of research in biorthogonal systems in Banach spaces, -provide notes and exercises related to the topic, suggest open problems and possible new directions of research.

Numerous exercises are included, and the only prerequisites are a basic background in functional analysis.

Notes and exercises related to the topic Presents open problems and possible directions of research in each chapter

Klappentext

The main theme of this book is the relation between the global structure
of Banach spaces and the various types of generalized "coordinate
systems" - or "bases" - they possess. This subject is not new and has
been investigated since the inception of the study of Banach spaces. In
this book, the authors systematically investigate the concepts of
Markushevich bases, fundamental systems, total systems and their
variants. The material naturally splits into the case of separable
Banach spaces, as is treated in the first two chapters, and the
nonseparable case, which is covered in the remainder of the book. This
book contains new results, and a substantial portion of this material
has never before appeared in book form. The book will be of interest to
both researchers and graduate students.

Topics covered in this book include:

• Biorthogonal Systems in Separable Banach Spaces
• Universality and Szlenk Index
• Weak Topologies and Renormings
• Biorthogonal Systems in Nonseparable Spaces
• Transfinite Sequence Spaces

• Applications

  Petr Hájek is Professor of Mathematics at the Mathematical Institute of
  the Academy of Sciences of the Czech Republic. Vicente Montesinos is
  Professor of Mathematics at the Polytechnic University of
  Valencia, Spain. Jon Vanderwerff is Professor of Mathematics at La
  Sierra University, in Riverside, California. Václav Zizler is Professor
  of Mathematics at the Mathematical Institute of the Academy of Sciences
  of the Czech Republic.

  Inhalt
  Separable Banach Spaces.- Universality and the Szlenk Index.- Review of Weak Topology and Renormings.- Biorthogonal Systems in Nonseparable Spaces.- Markushevich Bases.- Weak Compact Generating.- Transfinite Sequence Spaces.- More Applications.