Connected components of partition preserving diffeomorphisms

Abstract

Let f:R2 R be a real homogeneous polynomial and S(f) be the group of diffeomorphisms h:R2 R2 preserving f, i.e. f h = f. Denote by S(f,r), (0≤ r ≤ ∞), the identity path component of S(f) with respect to the weak Whitney CrW-topology. We prove that S(f,∞) = ·s = S(f,1) for all such f and that S(f,1) = S(f,0) if and only if f is a product of at least two distinct irreducible over R quadratic forms.