Cohomology and the controlling algebra of crossed homomorphisms on 3-Lie algebras

In this paper, first we give the notion of a crossed homomorphism on a Formula: see text-Lie algebra with respect to an action on another Formula: see text-Lie algebra, and characterize it using a homomorphism from a 3-Lie algebra to the semidirect product 3-Lie algebra. We also establish the relationship between crossed homomorphisms and relative Rota–Baxter operators of weight Formula: see text on 3-Lie algebras. Next we construct a cohomology theory for a crossed homomorphism on Formula: see text-Lie algebras and classify infinitesimal deformations of crossed homomorphisms using the second cohomology group. Finally, using the higher derived brackets, we construct an Formula: see text-algebra whose Maurer–Cartan elements are crossed homomorphisms. Consequently, we obtain the twisted Formula: see text-algebra that controls deformations of a given crossed homomorphism on Formula: see text-Lie algebras.