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Abstract
Let 𝒢 be a simple finite dimensional Lie algebra over the complex numbers and let 𝒢¯ = 𝒢1 ⊕…⊕ 𝒢 k be a regular semisimple subalgebra of 𝒢 with each 𝒢 i being a simple algebra of type A or C. It is shown that the lattice of submodules of a generalized Verma 𝒢-module constructed by parabolic induction starting from a simple torsion free 𝒢¯-module is almost always isomorphic to the lattice of submodules of an associated module formed as a quotient of a classical Verma module by a sum of Verma submodules. In particular, it is shown that the Mathieu admissible Verma modules involved have maximal submodules which are the sum of Verma modules.
Acknowledgments
The authors would like to thank the referee for several helpful comments, in particular for suggesting the elegant proof of Lemma 8 for the A n case.
D. J. Britten was supported in part by NSERC Grant #OGP0008471. V. M. Futorny was supported in part by CNPQ #300679/1997-1. F. W. Lemire was supported in part by NSERC Grant #OGP0007742.