CONICET | Buscador de Institutos y Recursos Humanos

A hypersymplectic metric on a manifold M4n is a pseudo-Riemannian metric of signature (2n; 2n) such that its holonomy group is contained in Sp(n;R). These metrics were introduced by N. Hitchin in the early '90s, and since then they have appeared in di®erent contexts, both in mathematics and physics, especially in string theory. Compact complex surfaces admitting hypersymplectics metrics were classi¯ed by H. Kamada in 2002, and in 2004 Fino, Pedersen, Poon and Sorensen exhibited hypersymplectic structures on a class of 2-step nilmanifolds in their search of neutral Calabi-Yau metrics. In this talk we show ¯rst our classi¯cation of 4-dimensional solvable Lie groups admitting left-invariant hypersymplectic metrics. Later, we exhibit a procedure to construct hypersymplecticstructures on R4n which are complete and invariant by a nilpotent Lie group acting simply and transitively on R4n. The degree of nilpotency is related to the flatness of the metric, since we show that the metric is flat if and only if the group is at most 2-step nilpotent.