Constructions of 3-Lie algebroids

Abstract

The paper investigates the construction of Lie algebroids and 3-Lie algebroids via connections generated by finite families of differential operators and dual sections. We first recall the description of Lie and n-Lie algebroid brackets in terms of connections, and introduce an n-curvature operator whose n-Bianchi identity characterizes the fundamental identity. We then provide sufficient conditions under which such generating families determine Lie algebroid and 3-Lie algebroid structures. The construction extends the single-operator approach and covers natural examples such as the Jacobi Lie algebroid. As an application, we construct a concrete 3-Lie algebroid structure arising from Poisson Lie algebroid data.