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Potential Theory and Geometry on Lie Groups

Potential Theory and Geometry on Lie Groups

£135.00

Part of New Mathematical Monographs

  • Publication planned for: February 2020
  • availability: Not yet published - available from February 2020
  • format: Hardback
  • isbn: 9781107036499

£ 135.00
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  • This book provides a complete and reasonably self-contained account of a new classification of connected Lie groups into two classes. The first part describes the use of tools from potential theory to establish the classification and to show that the analytic and algebraic approaches to the classification are equivalent. Part II covers geometric theory of the same classification and a proof that it is equivalent to the algebraic approach. Part III is a new approach to the geometric classification that requires more advanced geometric technology, namely homotopy, homology and the theory of currents. Using these methods, a more direct, but also more sophisticated, approach to the equivalence of the geometric and algebraic classification is made. Background material is introduced gradually to familiarise readers with ideas from areas such as Lie groups, differential topology and probability, in particular, random walks on groups. Numerous open problems inspire students to explore further.

    • Introduces a new approach to the classification of Lie groups
    • Provides the necessary background material on theory of currents, random walk theory, etc. for readers with no prior knowledge of these areas
    • Contains numerous open problems to inspire further development
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    Product details

    • Publication planned for: February 2020
    • format: Hardback
    • isbn: 9781107036499
    • dimensions: 228 x 152 mm
    • contains: 20 b/w illus. 130 exercises
    • availability: Not yet published - available from February 2020
  • Table of Contents

    Preface
    1. Introduction
    Part I. The Analytic and Algebraic Classification:
    2. The classification and the first main theorem
    3. NC-groups
    4. The B–NB classification
    5. NB-groups
    6. Other classes of locally compact groups
    Appendix A. Semisimple groups and the Iwasawa decomposition
    Appendix B. The characterisation of NB-algebras
    Appendix C. The structure of NB-groups
    Appendix D. Invariant differential operators and their diffusion kernels
    Appendix E. Additional results. Alternative proofs and prospects
    Part II. The Geometric Theory:
    7. The geometric theory. An introduction
    8. The geometric NC-theorem
    9. Algebra and geometries on C-groups
    10. The end game in the C-theorem
    11. The metric classification
    Appendix F. Retracts on general NB-groups (not necessarily simply connected)
    Part III. Homology Theory:
    12. The homotopy and homology classification of connected Lie groups
    13. The polynomial homology for simply connected soluble groups
    14. Cohomology on Lie groups
    Appendix G. Discrete groups
    Epilogue
    References
    Index.

  • Author

    N. Th. Varopoulos, Université de Paris VI (Pierre et Marie Curie)
    N. Th. Varopoulos was for many years a professor at Université de Paris VI. He is a member of the Institut Universitaire de France.

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