A new approach to the family of singularities $Re(x+iy)^m$

Details A new approach to the family of singularities $Re(x+iy)^m$ A new approach to the family of singularities $Re(x+iy)^m$

2008-09-17

arxiv.org/abs/0809.2868v1

Mathematics

Functional Analysis

27 pages

Scientific paper

Assume that $m\ge 2$ and let $l$ be a nonnegative integer with $l\ge m-4$. We give an alternative proof of the fact that any smooth function defined locally around $(0,0)\in \mathbb{R}^2$ with the Taylor power series at $(0,0)$ beginning with $$Re(x+iy)^m+0+...+0$$ ($l$ zeros) is diffeomorphically equivalent to $Re(x+iy)^m$ at $(0,0)$. For $m\ge 5$ and $C\ne 0$ we show that the function $$Re(x+iy)^m+C(x^2+y^2)^{m-2}$$ is not diffeomorphically equivalent to $Re(x+iy)^m$ at $(0,0)$.

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