Geometry of Müntz Spaces and Related Questions / Edition 1

Geometry of Müntz Spaces and Related Questions / Edition 1

by Vladimir I. Gurariy, Wolfgang Lusky
     
 

ISBN-10: 3540288007

ISBN-13: 9783540288008

Pub. Date: 12/20/2005

Publisher: Springer Berlin Heidelberg

Starting point and motivation for this volume is the classical Muentz theorem which states that the space of all polynomials on the unit interval, whose exponents have too many gaps, is no longer dense in the space of all continuous functions. The resulting spaces of Muentz polynomials are largely unexplored as far as the Banach space geometry is concerned and

…  See more details below

Overview

Starting point and motivation for this volume is the classical Muentz theorem which states that the space of all polynomials on the unit interval, whose exponents have too many gaps, is no longer dense in the space of all continuous functions. The resulting spaces of Muentz polynomials are largely unexplored as far as the Banach space geometry is concerned and deserve the attention that the authors arouse. They present the known theorems and prove new results concerning, for example, the isomorphic and isometric classification and the existence of bases in these spaces. Moreover they state many open problems. Although the viewpoint is that of the geometry of Banach spaces they only assume that the reader is familiar with basic functional analysis. In the first part of the book the Banach spaces notions are systematically introduced and are later on applied for Muentz spaces. They include the opening and inclination of subspaces, bases and bounded approximation properties and versions of universality.

Read More

Product Details

ISBN-13:
9783540288008
Publisher:
Springer Berlin Heidelberg
Publication date:
12/20/2005
Series:
Lecture Notes in Mathematics Series, #1870
Edition description:
2005
Pages:
176
Product dimensions:
9.21(w) x 6.14(h) x 0.42(d)

Table of Contents

Preface.- Part I Subspaces and Sequences in Banach Spaces: Disposition of Subspaces.- Sequences in Normed Spaces.- Isomorphism, Isometries and Embeddings.- Spaces of Universal Disposition.- Bounded Approximation Properties.- Part II On the Geometry of Müntz Sequences: Coefficient Estimates and the Müntz Theorem.- Classification and Elementary Properties of Müntz Sequences.- More on the Geometry of Müntz Sequences and Müntz Polynomials.- Operators of Finite Rank and Bases in Müntz Spaces.- Projection Types and the Isomorphism Problem for Müntz Spaces.- The Classes [M], A, P, and Pe.- Finite Dimensional Müntz Limiting Spaces in C.- References.- Index.

Customer Reviews

Average Review:

Write a Review

and post it to your social network

     

Most Helpful Customer Reviews

See all customer reviews >