New "metric-affine-like" generalization of Yang-Mills theory

Abstract

We suggest a new generalization of the U(n) Yang-Mills theory obtained by relaxing the condition of covariant constancy of the Hermitian form in the fibers, ∇a gαβ' 0. This theory is a simpler analogue of the metric-affine gravity with ∇a gbc 0. In our case, connection ∇a and Hermitian form gαβ' are two independent variables so total curvature and total potential are no longer anti-Hermitian matrices: thus, along with the standard YM potential Aa and field strength tensor Fab, it contains non-trivially interacting fields Ba, h, and Gab, Na, forming a non-Abelian generalization of Stückelberg theory. Due to the spontaneous symmetry breaking GL(n,C) U(n), these new fields can be made massive, and the limit M∞ restores the standard YM theory.