We characterize the structure of a seven-dimensional Lie algebra with non-trivial center endowed with a closed G_2-structure. Using this result, we classify all unimodular Lie algebras with non-trivial center admitting closed G_2-structures, up to isomorphism, and we show that six of them arise as the contactization of a symplectic Lie algebra. Finally, we prove that every semi-algebraic soliton on the contactization of a symplectic Lie algebra must be expanding, and we determine all unimodular Lie algebras with center of dimension at least two that admit semi-algebraic solitons, up to isomorphism.

Closed G_2-Structures on Unimodular Lie Algebras with Non-trivial Center

Fino A.;Raffero A.;Salvatore F.
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Abstract

We characterize the structure of a seven-dimensional Lie algebra with non-trivial center endowed with a closed G_2-structure. Using this result, we classify all unimodular Lie algebras with non-trivial center admitting closed G_2-structures, up to isomorphism, and we show that six of them arise as the contactization of a symplectic Lie algebra. Finally, we prove that every semi-algebraic soliton on the contactization of a symplectic Lie algebra must be expanding, and we determine all unimodular Lie algebras with center of dimension at least two that admit semi-algebraic solitons, up to isomorphism.
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Center; Closed G_2-structure; Contactization; Soliton; Unimodular Lie algebra
Fino A.; Raffero A.; Salvatore F.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2318/1850013
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