An F-space Sampler (London Mathematical Society Lecture Note Series Book 89) 1st Edition by N. J. Kalton (PDF)

    4

     

    Ebook Info

    • Published: 2046
    • Number of pages: 256 pages
    • Format: PDF
    • File Size: 9.25 MB
    • Authors: N. J. Kalton

    Description

    This book presents a theory motivated by the spaces LP, 0 ≤ p < l. These spaces are not locally convex, so the methods usually encountered in linear analysis (particularly the Hahn–Banach theorem) do not apply here. Questions about the size of the dual space are especially important in the non-locally convex setting, and are a central theme. Several of the classical problems in the area have been settled in the last decade, and a number of their solutions are presented here. The book begins with concrete examples (lp, LP, L0, HP) before going on to general results and important counterexamples. An F-space sampler will be of interest to research mathematicians and graduate students in functional analysis.

    User’s Reviews

    Reviews from Amazon users which were colected at the time this book was published on the website:

    Keywords

    Free Download An F-space Sampler (London Mathematical Society Lecture Note Series Book 89) 1st Edition in PDF format
    An F-space Sampler (London Mathematical Society Lecture Note Series Book 89) 1st Edition PDF Free Download
    Download An F-space Sampler (London Mathematical Society Lecture Note Series Book 89) 1st Edition 2046 PDF Free
    An F-space Sampler (London Mathematical Society Lecture Note Series Book 89) 1st Edition 2046 PDF Free Download
    Download An F-space Sampler (London Mathematical Society Lecture Note Series Book 89) 1st Edition PDF
    Free Download Ebook An F-space Sampler (London Mathematical Society Lecture Note Series Book 89) 1st Edition

    Previous articleGeometry of Banach Spaces: Proceedings of the Conference Held in Strobl, Austria 1989 (London Mathematical Society Lecture Note Series Book 158) 1st Edition by P. F. X. Müller (PDF)
    Next articleThe Potential Distribution Theorem and Models of Molecular Solutions 1st Edition by Tom L. Beck (PDF)