Minimum codimension of eigenspaces in irreducible representations of simple linear algebraic groups
Abstract
Let k be an algebraically closed field of characteristic p ≥ 0, let G be a simple simply connected classical linear algebraic group of rank and let T be a maximal torus in G with rational character group X(T). For a nonzero p-restricted dominant weight λ ∈ X(T), let V be the associated irreducible kG-module. Define G(V) to be the minimum codimension of eigenspaces corresponding to non-central elements of G on V. In this paper, we calculate G(V) for G of type A, ≥ 16, and dim(V) ≤ 32; for G of type B, respectively C, ≥ 14, and dim(V) ≤ 43; and for G of type D, ≥ 16, and dim(V) ≤ 43. Moreover, for the groups of smaller rank and their corresponding irreducible modules with dimension satisfying the above bounds, we determine lower-bounds for G(V).
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