Deforming the weighted-homogeneous foliation, and trivializing families of semi-weighted homogeneous ICIS

Abstract

Let Xo be a weighted-homogeneous complete intersection germ in (RN,o) or (CN,o), with arbitrary singularities, possibly non-reduced. Take the foliation of the ambient space by weighted-homogeneous real arcs, s. Take a deformation of Xo by higher order terms, Xt. Does the foliation s deform compatibly with Xt? We identify the ``obstruction locus", in Xo, outside of which such a deformation does exist, and possesses exceptionally nice properties. Using this deformed foliation we construct a contact trivialization of the family of defining equations by a homeomorphism that is real analytic (resp. Nash) off the origin, differentiable at the origin, whose presentation in weighted-polar coordinates is globally real-analytic (resp. globally Nash), and with controlled Lipschitz/C1-properties.