We present a phase--space formulation of bilocal systems in whichYang--Mills--type gauge couplings emerge from the geometric structure ofthe symplectic form rather than from additional constraints or dynamicalpostulates.Starting from a bilocal configuration space with internal degrees offreedom described by coadjoint orbits, we show that the localization ofglobal internal symmetries leads naturally to a nontrivial connection onphase space.The resulting modification of the Liouville form induces covariantmomenta, non--abelian curvature, and Wong--type equations of motion,while the underlying constraint structure remains unchanged.This construction provides a minimal and internally consistent mechanismfor the appearance of gauge interactions within the bilocal phase--spaceformalism.
Andrzej Tyminski (Thu,) studied this question.