Journal article
Decomposing modular tensor products, and periodicity of 'Jordan partitions'
SP Glasby, CE Praeger, B Xia
Journal of Algebra | ACADEMIC PRESS INC ELSEVIER SCIENCE | Published : 2016
Abstract
Let Jr denote an r×r matrix with minimal and characteristic polynomials (t-1)r. Suppose r≤s. It is not hard to show that the Jordan canonical form of Jr⊗Js is similar to Jλ1⊕⋯⊕Jλr where λ1≥⋯≥λr>0 and ∑i=1rλi=rs. The partition λ(r, s, p):=(λ1, . . ., λr) of rs, which depends only on r, s and the characteristic p:=char(F), has many applications including the study of algebraic groups. We prove new periodicity and duality results for λ(r, s, p) that depend on the smallest p-power exceeding r. This generalizes results of J.A. Green, B. Srinivasan, and others which depend on the smallest p-power exceeding the (potentially large) integer s. It also implies that for fixed r we can construct a finit..
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Awarded by Australian Research Council
Funding Acknowledgements
We would like to thank Gary Seitz and Martin Liebeck for helpful conversations. We thank Neil Strickland for his answer to a question posed on MathOverflow<SUP>5</SUP> by the third author. We also thank Michael Barry for showing us his paper [2]. The first and second authors acknowledge the support of the Australian Research Council Discovery Grant DP110101153. This work was done during the visit of the third author to School of Mathematics and Statistics, University of Western Australia, and he would like to thank the China Scholarship Council for its financial support.