Lifting quasianalytic mappings over invariants

Abstract

Let : G GL(V) be a rational finite dimensional complex representation of a reductive linear algebraic group G, and let σ1,σn be a system of generators of the algebra of invariant polynomials C[V]G. We study the problem of lifting mappings f : Rq ⊃eq U σ(V) ⊂eq Cn over the mapping of invariants σ=(σ1,σn) : V σ(V). Note that σ(V) can be identified with the categorical quotient V /\!\!/ G and its points correspond bijectively to the closed orbits in V. We prove that, if f belongs to a quasianalytic subclass C ⊂eq C∞ satisfying some mild closedness properties which guarantee resolution of singularities in C (e.g.\ the real analytic class), then f admits a lift of the same class C after desingularization by local blow-ups and local power substitutions. As a consequence we show that f itself allows for a lift which belongs to SBVloc (i.e.\ special functions of bounded variation). If is a real representation of a compact Lie group, we obtain stronger versions.