Closed G2-eigenforms and exact G2-structures

Abstract

A study is made of left-invariant G2-structures with an exact 3-form on a Lie group G whose Lie algebra g admits a codimension-one nilpotent ideal h. It is shown that such a Lie group G cannot admit a left-invariant closed G2-eigenform for the Laplacian and that any compact solvmanifold G arising from G does not admit an (invariant) exact G2-structure. We also classify the seven-dimensional Lie algebras g with codimension-one ideal equal to the complex Heisenberg Lie algebra which admit exact G2-structures with or without special torsion. To achieve these goals, we first determine the six-dimensional nilpotent Lie algebras h admitting an exact SL(3,C)-structure or a half-flat SU(3)-structure (ω,) with exact , respectively.

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