Aufsatz in einer Fachzeitschrift
Schur subalgebras and an application to the symmetric group
Details zur Publikation
Autor(inn)en: | Henke, A. |
Publikationsjahr: | 2000 |
Zeitschrift: | Journal of Algebra |
Seitenbereich: | 342-362 |
Jahrgang/Band : | 233 |
Erste Seite: | 342 |
Letzte Seite: | 362 |
ISSN: | 0021-8693 |
Zusammenfassung, Abstract
Let K be an infinite field of prime characteristic p and let d less than or equal to r be positive integers of the same parity satisfying a certain congruence condition. We prove that the Schur algebra S(2, d) is isomorphic to a subalgebra of the form eS(2, r)e, where e is a certain idempotent of S(2, r). Translating this result via Ringel duality to the symmetric groups Sigma (d), and Sigma (r), we obtain lattice isomorphisms between Specht modules, between Young modules, and between permutation modules. Here modules labelled by the partitions (r - k, k) correspond to modules labelled by (d - k, k). This provides a representation theoretical interpretation for part of the fractal structures observed for the decomposition numbers of the symmetric groups corresponding to two-part partitions. (C) 2000 Academic press.
Let K be an infinite field of prime characteristic p and let d less than or equal to r be positive integers of the same parity satisfying a certain congruence condition. We prove that the Schur algebra S(2, d) is isomorphic to a subalgebra of the form eS(2, r)e, where e is a certain idempotent of S(2, r). Translating this result via Ringel duality to the symmetric groups Sigma (d), and Sigma (r), we obtain lattice isomorphisms between Specht modules, between Young modules, and between permutation modules. Here modules labelled by the partitions (r - k, k) correspond to modules labelled by (d - k, k). This provides a representation theoretical interpretation for part of the fractal structures observed for the decomposition numbers of the symmetric groups corresponding to two-part partitions. (C) 2000 Academic press.
