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Abstract
It is proved that the restriction of a p-restricted representation of a classical algebraic group G of rank r in characteristic p > 0 to a naturally embedded semisimple subgroup cannot be completely reducible (semisimple) if the subgroup has a simple component of rank m small enough with respect to r and the highest weight is large enough with respect to p. It suffices to assume that r ≥ 2m and that the highest weight is equal to ∑ r i=1 ai ω i with ∑ r i=1 ai ≥ 2p − 1 if p ≠ 2 or G ≠ Cr (K) and ∑ r i=1 ai ≥ 4 for p = 2 and G = Cr (K).
ACKNOWLEDGMENTS
This research has been supported by the Belarus Basic Research Foundation, project F98-180. The author would like to thank George McNinch for the information on some recent publications on the topic.