On the singularities of Mishchenko-Fomenko systems

Abstract

To each complex semisimple Lie algebra g and regular element a∈greg, one associates a Mishchenko-Fomenko subalgebra Fa⊂eqC[g]. This subalgebra amounts to a completely integrable system on the Poisson variety g, and as such has a bifurcation diagram a⊂eqSpec(Fa). We prove that a has codimension one in Spec(Fa) if a∈greg is not nilpotent, and that it has codimension one or two if a∈greg is nilpotent. In the nilpotent case, we show each of the possible codimensions to be achievable. Our results significantly sharpen existing estimates of the codimension of a.