Locally conformal symplectic structures on Lie algebras of type I and their solvmanifolds

TL;DR

This paper investigates Lie algebras of type I, proving trivial Morse-Novikov cohomology, characterizing LCS structures as of the first kind, and constructing compact solvmanifolds with invariant LCS structures.

Contribution

It establishes that all LCS structures on type I Lie algebras are of the first kind and provides explicit lattices for certain 6-dimensional Lie groups to produce compact solvmanifolds with invariant LCS.

Findings

Morse-Novikov cohomology is trivial for type I Lie algebras.

All LCS structures on type I Lie algebras are of the first kind.

Constructed lattices for 6-dimensional Lie groups admit invariant LCS structures.

Abstract

We study Lie algebras of type I, that is, a Lie algebra $\mathfrak{g}$ where all the eigenvalues of the operator ad$_X$ are imaginary for all $X\in \mathfrak{g}$. We prove that the Morse-Novikov cohomology of a Lie algebra of type I is trivial for any closed $1$-form. We focus on locally conformal symplectic structures (LCS) on Lie algebras of type I. In particular we show that for a Lie algebra of type I any LCS structure is of the first kind. We also exhibit lattices for some $6$-dimensional Lie groups of type I admitting left invariant LCS structures in order to produce compact solvmanifolds equipped with an invariant LCS structure.