Dynamical decoupling and Kac-Moody current representation in multicomponent integrable systems

The conformal invariant character of $\nu$-multicomponent integrable systems (with $\nu$ branches of gapless excitations) is described from the point of view of the response to curvature of the two-dimensional space. The $\nu\times\nu$ elements of the dressed charge matrix are shown to be transition matrix elements of the zero ($\mu =0$) components of the diagonal generators of $\nu$ independent Kac-Moody algebras (Cartan currents). The dynamical decoupling which occurs in these systems is characterized in terms of the conductivities associated with the $\mu = 1$ components of the Cartan currents.