Lattic isomorphisms of lie algebras

D. W. Barnes

doi:10.1017/S1446788700025301

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Let L be a finite dimensional Lie algebra over the Field F. We denote by (L) the lattice of all subalgebras of L. By a lattice isomorphiusm (whicn we abbrevite to -isomorphism) of L onto a Lie algebra M over the same field F, we mean an isomorphism of (L) onto (M). It is possible for non-isomorphic Lie algebras to -isomorphic, for example, the algebra of real vectors with product the vector product is -isomorphic to any 2-dimensional Lie algebra over the field of real numbers.

References

[1]Barnes, D. W. and Wall, G. E., On normaliser preserving lattice isomorphisms between nilpotent groups (to appear).Google Scholar

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[3]Séminaire, “Sophus Lie”: 1954/55, Théorie des algèbres de Lie, topologie des groupes de Lie (Ecole Normale Supérieure, Paris, 1955).Google Scholar

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