Lifting differentiable curves from orbit spaces

Abstract

Let : G → O(V) be a real finite dimensional orthogonal representation of a compact Lie group, let σ = (σ1,…,σn) : V Rn, where σ1,…,σn form a minimal system of homogeneous generators of the G-invariant polynomials on V, and set d = i deg σi. We prove that for each Cd-1,1-curve c in σ(V) ⊂eq Rn there exits a locally Lipschitz lift over σ, i.e., a locally Lipschitz curve c in V so that c = σ c, and we obtain explicit bounds for the Lipschitz constant of c in terms of c. Moreover, we show that each Cd-curve in σ(V) admits a C1-lift. For finite groups G we deduce a multivariable version and some further results.