On the existence of W2 p solutions for fully nonlinear elliptic equations under either relaxed or no convexity assumptions

N. V. Krylov

doi:10.1142/S0219199717500092

On the existence of W² _p solutions for fully nonlinear elliptic equations under either relaxed or no convexity assumptions

N. V. Krylov

Mathematics

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11 Scopus citations

Abstract

We establish the existence of solutions of fully nonlinear elliptic second-order equations like H(v,Dv,D2v,x) = 0 in smooth domains without requiring H to be convex or concave with respect to the second-order derivatives. Apart from ellipticity nothing is required of H at points at which |D2v|≤ K, where K is any given constant. For large |D2v| some kind of relaxed convexity assumption with respect to D2v mixed with a VMO condition with respect to x are still imposed. The solutions are sought in Sobolev classes. We also establish the solvability without almost any conditions on H, apart from ellipticity, but of a "cut-off" version of the equation H(v,Dv,D2v,x) = 0.

Original language	English (US)
Article number	1750009
Journal	Communications in Contemporary Mathematics
Volume	19
Issue number	6
DOIs	https://doi.org/10.1142/S0219199717500092
State	Published - Dec 1 2017

Bibliographical note

Publisher Copyright:
© 2017 World Scientific Publishing Company.

Keywords

Fully nonlinear elliptic equations
cut-off equations
finite differences

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10.1142/S0219199717500092

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Cite this

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KW - cut-off equations

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