A Morse Lemma for degenerate critical points of solutions of nonlinear equations in $\R^2$

Massimo Grossi

arxiv: 1806.08559 · v1 · pith:5DH7D2TFnew · submitted 2018-06-22 · 🧮 math.AP

A Morse Lemma for degenerate critical points of solutions of nonlinear equations in R²

Massimo Grossi This is my paper

classification 🧮 math.AP

keywords criticalpointsdegeneratelemmamorseballdeltaequations

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In this paper we prove a Morse Lemma for degenerate critical points of a function u which satisfies -\Delta u=f(u) in B_1, where B_1 is the unit ball of R^2 and f is a smooth nonlinearity. Other results on the nondegeneracy of the critical points and the shape of the level sets are proved.

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A Morse Lemma for degenerate critical points of solutions of nonlinear equations in R²

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