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ISSAC
1994
Springer
1994
Springer
Constructing Permutation Representations for Large Matrix Groups
New techniques, both theoretical and practical, are presented for constructing a permutation representation for a matrix group. We assume that the resulting permutation degree, n, can be 10,000,000 and larger. The key idea is to build the new permutation representation using the conjugation action on a conjugacy class of subgroups of prime order. A unique signature for each group element corresponding to the conjugacy class is used in order to avoid matrix multiplication. The requirement of at least n matrix multiplications would otherwise have made the computation hopelessly impractical. Additional software optimizations are described, which reduce the CPU time by at least an additional factor of 10. Further, a special data structure is designed that serves both as a search tree and as a hash array, while re
Real-time Traffic| Added | 10 Aug 2010 |
| Updated | 10 Aug 2010 |
| Type | Conference |
| Year | 1994 |
| Where | ISSAC |
| Authors | Gene Cooperman, Larry Finkelstein, Bryant W. York, Michael Tselman |
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