Moyal quantization and stable homology of necklace Lie algebras
Abstract
We compute the stable homology of necklace Lie algebras associated with quivers and give a construction of stable homology classes from certain A∞-categories. Our construction is a generalization of the construction of homology classes of moduli spaces of curves due to M. Kontsevich. In the second part of the paper we produce a Moyal-type quantization of the symmetric algebra of a necklace Lie algebra. The resulting quantized algebra has natural representations in the usual Moyal quantization of polynomial algebras.
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