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For every differential graded Lie algebra g one can define two different group actions on the Maurer-Cartan elements: the ubiquitous gauge action and the action of Lie_-isotopies of g, which we call the ambient action. In this note, we explain how the assertion of gauge triviality of a homologically trivial ambient action relates to the calculus of dendriform, Zinbiel, and Rota-Baxter algebras, and to Eulerian idempotents. In particular, we exhibit new relationships between these algebraic structures and the operad of rational functions defined by Loday.
Dotsenko et al. (Tue,) studied this question.