Bracket-Preserving property of Anchor Maps and Applications to Various Brackets

Abstract

Let E → M be a smooth vector bundle with a bilinear product on (E) satisfying the Jacobi identity. Assuming only the existence of an anchor map a we show that a([X,Y]) = [aX,aY]c. This gives the redundancy of the homomorphism condition in the definition of Leibniz algebroid (in particular if it arises from a Nambu-Poisson manifold); an aspect not addressed in the literature. We apply our result to the brackets of Hagiwara, Ibanez et. al; we settle an old query of Uchino on redundancy for Courant bracket.