On the existence of $W^{2}_{p}$ solutions for fully nonlinear elliptic equations under relaxed convexity assumptions

Details On the existence of $W^{2}_{p}$ solutions for fully nonlinear elliptic equations under relaxed convexity assumptions On the existence of $W^{2}_{p}$ solutions for fully nonlinear elliptic equations under relaxed convexity assumptions

2012-03-07

arxiv.org/abs/1203.1655v1

Mathematics

Analysis of PDEs

23 pages

Scientific paper

We establish the existence and uniqueness of solutions of fully nonlinear elliptic second-order equations like $H(v,Dv,D^{2}v,x)=0$ 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 $|D^{2}v|\leq K$, where $K$ is any given constant. For large $|D^{2}v|$ some kind of relaxed convexity assumption with respect to $D^{2}v$ mixed with a VMO condition with respect to $x$ are still imposed. The solutions are sought in Sobolev classes.

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