# Fb2 Analytic Pro-P Groups (Cambridge Studies in Advanced Mathematics) ePub

## by J. D. Dixon,M. P. F. Du Sautoy,A. Mann,D. Segal

Category: | Mathematics |

Subcategory: | Science books |

Author: | J. D. Dixon,M. P. F. Du Sautoy,A. Mann,D. Segal |

ISBN: | 0521650119 |

ISBN13: | 978-0521650113 |

Language: | English |

Publisher: | Cambridge University Press; 2 edition (October 28, 1999) |

Pages: | 386 |

Fb2 eBook: | 1522 kb |

ePub eBook: | 1480 kb |

Digital formats: | rtf lrf lrf doc |

J. D. Dixon, M. P. F. Du Sautoy, A. Mann, D. Segal. Download (djvu, 1. 6 Mb) Donate Read.

Series: Cambridge Studies in Advanced Mathematics. Other readers will always be interested in your opinion of the books you've read. Whether you've loved the book or not, if you give your honest and detailed thoughts then people will find new books that are right for them.

162 results in Cambridge Studies in Advanced Mathematics . Relevance Title Sorted by Date. This introduction to automorphic forms on adelic groups G(A) emphasises the role of representation theory. The exposition is driven by examples, and collects and extends many results scattered throughout the literature, in particular the Langlands constant term formula for Eisenstein series on G(A) as well as the Casselman–Shalika formula for the p-adic spherical Whittaker function. This book also covers more advanced topics such as spherical Hecke algebras and automorphic L-functions.

On July 20, we had the largest server crash in the last 2 years. Series: Cambridge Studies in Advanced Mathematics. File: PDF, 1. 6 MB. Читать онлайн.

62 ; Richard P. Stanley ; Enumerative combinatorics, volume 2 ; 9780521560696. Dudley ; Uniform central limit theorems ; 9780521461023. 137 ; Camil Muscalu, Wilhelm Schlag ; Classical and multilinear harmonic analysis, volume I ; 9780521882453. 138 ; Camil Muscalu, Wilhelm Schlag ; Classical and multilinear harmonic analysis, volume II ; 9781107031821.

ISSN 0950-6330 (Print). Publisher: Cambridge University Press. Volume 61, Number 1, 1999. next issue . Contents.

In mathematics, a pro-p group (for some prime number p) is a profinite group. Dixon, J. du Sautoy, M. Mann, . Segal, D. (1991), Analytic pro-p-groups, Cambridge University Press, ISBN 0-521-39580-1, MR 1152800

In mathematics, a pro-p group (for some prime number p) is a profinite group. G {displaystyle G}. such that for any open normal subgroup. (1991), Analytic pro-p-groups, Cambridge University Press, ISBN 0-521-39580-1, MR 1152800. du Sautoy, . Segal, . Shalev, A. (2000), New Horizons in pro-p Groups, Birkhäuser, ISBN 0-8176-4171-8. This algebra-related article is a stub. php?title Pro-p group&oldid 923542450". Categories: Infinite group theory.

Analytic pro-p groups, 2nd ed. (with . du Sautoy and A. Mann) Cambridge Studies in Advanced Mathematics 61, CUP, Cambridge 1999; paperback 2003. ISBN 978-0-521-54218-0. 184, Birkhauser, Boston 2000. ISBN 0-8176-4171-8, 3-7643-4171-8.

Analytic Pro-P Groups book. Dixon, Du Sautoy M P F., Mann A., D. The first part of the book is group-theoretic. It develops the theory of pro-p groups of finite rank, starting from first principles and using elementary methods.

D. Mann and D. Segal, Analytic pro-p Groups, Cambridge Studies in Advanced Mathematics, Vol. 61, Cambridge University Press, Cambridge, 1999. M. Ershov, New just-infinite pro-p groups of finite width of the Nottingham group, Journal of Algebra 275 (2004), 419–449. Ershov, On the commensurator of the Nottingham group, Transactions of the American Mathematical Society 362 (2010), 6663–6678.