N=2 structures on solvable Lie algebras: the c=9 classification

TL;DR

This paper classifies N=2 superconformal structures on self-dual solvable Lie algebras with central charge c=9, using the correspondence with Manin triples and exploring related Lie algebraic properties.

Contribution

It provides a classification of c=9 N=2 structures on self-dual solvable Lie algebras via Manin triples, and offers simplified proofs for related Lie algebraic results.

Findings

Classification of c=9 N=2 structures on solvable Lie algebras

Connection between N=2 structures and Manin triples

Simplified proofs for Lie algebraic properties

Abstract

Let G be a finite-dimensional Lie algebra (not necessarily semisimple). It is known that if G is self-dual (that is, if it possesses an invariant metric) then there is a canonical N=1 superconformal algebra associated to its N=1 affinization---that is, it admits an N=1 (affine) Sugawara construction. Under certain additional hypotheses, this N=1 structure admits an N=2 extension. If this is the case, G is said to possess an N=2 structure. It is also known that an N=2 structure on a self-dual Lie algebra G is equivalent to a vector space decomposition G = G_+ \oplus G_- where G_\pm are isotropic Lie subalgebras. In other words, N=2 structures on G are in one-to-one correspondence with Manin triples (G,G_+,G_-). In this paper we exploit this correspondence to obtain a classification of the c=9 N=2 structures on self-dual solvable Lie algebras. In the process we also give some simple proofs for a variety of Lie algebraic results concerning self-dual Lie algebras admitting symplectic or K\"ahler structures.