Local Cr-right equivalence of Cr+1 functions
Abstract
Let f,g:(Rn,0)→ (R,0) be Cr+1 functions, r∈ N. We will show that if ∇ f(0)=0 and there exist a neigbourhood U of 0∈ Rn and a constant C>0 such that |∂m(g-f)(x)|≤ C |∇ f(x)|r+2-|m|, x∈ U, for any m∈ N0n such that |m|≤ r, then there exists a Cr diffeomorphism :(Rn,0)→ (Rn,0) such that f=g in a neighbourhood of 0.
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