Invariant metrics on current Lie algebras

Abstract

In this work we state conditions for a current Lie algebra S to admit an invariant metric, where is a quadratic Lie algebra and S is an associative and commutative algebra with unit. We also consider the reciprocal: if S admits an invariant metric, we state necessary and sufficient conditions for to admit an invariant metric. In particular, we show that if is an indecomposable quadratic Lie algebra, then S admits an invariant metric if and only if S also admits an invariant, symmetric and non-degenerate bilinear form. In addition, we prove a theorem similar to the double extension for S, where is an indecomposable, nilpotent and quadratic Lie algebra.