Low dimensional cohomology of general conformal algebras gcN
Abstract
We compute the low dimensional cohomologies Hq(gcN,C), Hq(gcN,) of the infinite rank general Lie conformal algebras gcN with trivial coefficients for q3, N=1 or q2, N2. We also prove that the cohomology of gcN with coefficients in its natural module is trivial, i.e., H*(gcN,[]N)=0; thus partially solve an open problem of Bakalov-Kac-Voronov in [ Comm. Math. Phys., 200 (1999), 561-598].
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