(joint work with Roman Kadobianski, submitted)
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We study
locally conformal symplectic structures and their generalizations from the
point of view of transitive Lie algebroids. To consider l.c.s. structures and
their generalizations we use Lie algebroids with trivial adjoint Lie algebra
bundle M´ R and M´ g. We observe that important l.c.s's notions can be translated on the Lie algebroid's
language. We generalize l.c.s. structures to g-l.c.s. structures in which we
can consider an arbitrary finite dimensional Lie algebra g instead of the
commutative Lie algebra R.