On stability and nonvanishing of homomorphism spaces between Weyl modules
Abstract
Consider the general linear group G=GLn(K) defined over an infinite field K of positive characteristic p. We denote by (λ) the Weyl module of G which corresponds to a partition λ. Let λ, μ be partitions of r and let γ be partition with all parts divisible by p. In the first main result of this paper, we find sufficient conditions on λ, μ and γ so that HomG((λ),(μ)) HomG((λ +γ),(μ +γ)), thus providing an answer to a question of D. Hemmer. As corollaries we obtain stability and periodicity results for homomorphism spaces. In the second main result we find related sufficient conditions on λ, μ and p so that HomG((λ),(μ)) is nonzero. An explicit map is provided that corresponds to the sum of all semistandard tableaux of shape μ and weight λ.
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