Ebook Info
- Published: 2003
- Number of pages: 274 pages
- Format: PDF
- File Size: 1.60 MB
- Authors: Ákos Seress
Description
Permutation group algorithms are indispensable in the proofs of many deep results, including the construction and study of sporadic finite simple groups. This work describes the theory behind permutation group algorithms, up to the most recent developments based on the classification of finite simple groups. Rigorous complexity estimates, implementation hints, and advanced exercises are included throughout. The central theme is the description of nearly linear time algorithms, which are extremely fast both in terms of asymptotic analysis and of practical running time. The book fills a significant gap in the symbolic computation literature for readers interested in using computers in group theory.
User’s Reviews
Editorial Reviews: Review “This book provides a virtually complete state-of-the-art account of algorithms for computing with finite permutation groups. Almost all of the algorithms described are accompanied by complete and detailed correctness proofs and complexity analyses. It is very clearly written throughout, and is likely to become the standard and definitive reference work in the field.” Mathematical Reviews Book Description Theory of permutation group algorithms for graduates and above. Exercises and hints for implementation throughout.
Keywords
Free Download Permutation Group Algorithms (Cambridge Tracts in Mathematics, Series Number 152) 1st Edition in PDF format
Permutation Group Algorithms (Cambridge Tracts in Mathematics, Series Number 152) 1st Edition PDF Free Download
Download Permutation Group Algorithms (Cambridge Tracts in Mathematics, Series Number 152) 1st Edition 2003 PDF Free
Permutation Group Algorithms (Cambridge Tracts in Mathematics, Series Number 152) 1st Edition 2003 PDF Free Download
Download Permutation Group Algorithms (Cambridge Tracts in Mathematics, Series Number 152) 1st Edition PDF
Free Download Ebook Permutation Group Algorithms (Cambridge Tracts in Mathematics, Series Number 152) 1st Edition