On Some Algebraic Structures Arising in String Theory
Abstract
Lian and Zuckerman proved that the homology of a topological chiral algebra can be equipped with the structure of a BV-algebra; one can introduce a multiplication, an odd bracket, and an odd operator having the same properties as the corresponding operations in Batalin-Vilkovisky quantization procedure. We give a simple proof of their results and discuss a generalization of these results to the non chiral case. To simplify our proofs we use the following theorem giving a characterization of a BV-algebra in terms of multiplication and an operator : If A is a supercommutative, associative algebra and is an odd second order derivation on A satisfying 2=0, one can provide A with the structure of a BV-algebra.
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