Higher Multi-Courant Algebroids

Abstract

The binary bracket of a Courant algebroid structure on (E, ·,· ) can be extended to a n-ary bracket on (E), yielding a multi-Courant algebroid. These n-ary brackets form a Poisson algebra and were defined, in an algebraic setting, by Keller and Waldmann. We construct a higher geometric version of Keller-Waldmann Poisson algebra and define higher multi-Courant algebroids. As Courant algebroid structures can be seen as degree 3 functions on a graded symplectic manifold of degree 2, higher multi-Courant structures can be seen as functions of degree n≥ 3 on that graded symplectic manifold.