First and second cohomologies of grading-restricted vertex algebras

Abstract

Let V be a grading-restricted vertex algebra and W a V-module. We show that for any m∈ Z+, the first cohomology H1m(V, W) of V with coefficients in W introduced by the author is linearly isomorphic to the space of derivations from V to W. In particular, H1m(V, W) for m∈ N are equal (and can be denoted using the same notation H1(V, W)). We also show that the second cohomology H212(V, W) of V with coefficients in W introduced by the author corresponds bijectively to the set of equivalence classes of square-zero extensions of V by W. In the case that W=V, we show that the second cohomology H212(V, V) corresponds bijectively to the set of equivalence classes of first order deformations of V.