Classification and versal deformations of L∈finity algebras on a 2|1-dimensional space
Abstract
This article explores 2-graded L∈finity algebra structures on a 2|1-dimensional vector space. The reader should note that our convention on the parities is the opposite of the usual one, because we define our structures on the symmetric coalgebra of the parity reversion of a space, so our 2|1-dimensional L∈finity algebras correspond to the usual 1|2-dimensional algebras. We give a complete classification of all structures with a nonzero degree 1 term. We also classify all degree 2 codifferentials, which is the same as a classification of all 1|2-dimensional Z2-graded Lie algebras. For each of these algebra structures, we calculate the cohomology and a miniversal deformation.
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