Abelian gauge-like groups of L∞-algebras
Abstract
Given a finite type degree-wise nilpotent L∞-algebra, we construct an abelian group that acts on the set of Maurer-Cartan elements of the given L∞-algebra so that the quotient by this action becomes the moduli space of equivalence classes of Maurer-Cartan elements. Specializing this to degree-wise nilpotent dg Lie algebras, we find that the associated ordinary gauge group of the dg Lie algebra with the Baker-Campbell-Hausdorff multiplication might be substituted by the underlying additive group. This additive group acts on the Maurer-Cartan elements, and the quotient by this action yields the moduli space of gauge-equivalence classes of Maurer-Cartan elements.
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