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Details for article 11 of 16 found articles
| Title: |
Minimal characters of the finite classical groups |
| Author: |
Tiep, Pham Huu Zalesskii, Alexander E. |
| Appeared in: |
Communications in algebra |
| Paging: | Volume 24 (1996) nr. 6 pages 2093-2167 |
| Year: |
1996 |
| Contents: |
Let G(q) be a finite simple group of Lie type over a finite field of order q and d(G(q)) the minimal degree of faithful projective complex representations of G(q). For the case G(q) is a classical group we deter-mine the number of projective complex characters of G(q) of degree d(G(q)). In several cases we also determine the projective complex characters of the second and the third lowest degrees. As a corollary of these results we deduce the classification of quasi-simple irreducible complex linear groups of degree at most 2rr a prime divisor of the group order. |
| Publisher: |
Taylor & Francis |
| Source file: |
Elektronische Wetenschappelijke Tijdschriften |
Details for article 11 of 16 found articles
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