Title | New Horizons in pro-p Groups [electronic resource] / edited by Marcus du Sautoy, Dan Segal, Aner Shalev |
---|---|

Imprint | Boston, MA : Birkhรคuser Boston : Imprint: Birkhรคuser, 2000 |

Connect to | http://dx.doi.org/10.1007/978-1-4612-1380-2 |

Descript | XIII, 426 p. online resource |

SUMMARY

A pro-p group is the inverse limit of some system of finite p-groups, that is, of groups of prime-power order where the prime - conventionally denoted p - is fixed. Thus from one point of view, to study a pro-p group is the same as studying an infinite family of finite groups; but a pro-p group is also a compact topological group, and the compactness works its usual magic to bring 'infinite' problems down to manageable proportions. The p-adic integers appeared about a century ago, but the systematic study of pro-p groups in general is a fairly recent development. Although much has been disยญ covered, many avenues remain to be explored; the purpose of this book is to present a coherent account of the considerable achievements of the last several years, and to point the way forward. Thus our aim is both to stimulate research and to provide the comprehensive background on which that research must be based. The chapters cover a wide range. In order to ensure the most authoritative account, we have arranged for each chapter to be written by a leading contributor (or contributors) to the topic in question. Pro-p groups appear in several different, though sometimes overlapping, contexts

CONTENT

1. Lie Methods in the Theory of pro-p Groups -- 2. On the Classification of p-groups and pro-p Groups -- 3. Pro-p Trees and Applications -- 4. Just Infinite Branch Groups -- 5. On Just Infinite Abstract and Profinite Groups -- 6. The Nottingham Group -- 7. On Groups Satisfying the Golodโ{128}{148}Shafarevich Condition -- 8. Subgroup Growth in pro-p Groups -- 9. Zeta Functions of Groups -- 10. Where the Wild Things are: Ramification Groups and the Nottingham Group -- 11. p-adic Galois Representations and pro-p Galois Groups -- 12. Cohomology of p-adic Analytic Groups -- Appendix: Further Problems

Mathematics
Algebra
Group theory
Mathematical analysis
Analysis (Mathematics)
Number theory
Mathematics
Group Theory and Generalizations
Algebra
Analysis
Number Theory