Superinduction for pattern groups
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It is well known that the representation theory of the finite group of unipotent upper-triangular matrices U[subscript n] over a finite field is a wild problem. By instead considering approximately irreducible representations (supercharacters), one obtains a rich combinatorial theory analogous to that of the symmetric group, where we replace partition combinatorics with set-partitions. This paper studies Diaconis–Isaacs' concept of superinduction in pattern groups. While superinduction shares many desirable properties with usual induction, it no longer takes characters to characters. We begin by finding sufficient conditions guaranteeing that superinduction is in fact induction. It turns out for two natural embeddings of U[subscript m] in U[subscript n], superinduction is induction. We conclude with an explicit combinatorial algorithm for computing this induction analogous to the Pieri-formulas for the symmetric group.
Date issued
2009-04Department
Massachusetts Institute of Technology. Department of MathematicsJournal
Journal of Algebra
Publisher
Elsevier
Citation
Marberg, Eric, and Nathaniel Thiem. “Superinduction for Pattern Groups.” Journal of Algebra 321, no. 12 (June 2009): 3681–3703. © 2009 Elsevier Inc.
Version: Final published version
ISSN
00218693
1090-266X