Multisymplectic formulation of Yang-Mills equations and Ehresmann connections

Abstract

We present a multisymplectic formulation of the Yang-Mills equations. The connections are represented by normalized equivariant 1-forms on the total space of a principal bundle, with values in a Lie algebra. Within the multisymplectic framework we realize that, under reasonable hypotheses, it is not necessary to assume the equivariance condition a priori, since this condition is a consequence of the dynamical equations.