Connor Mooney
Published 2013-04-09, updated 2013-08-01Version 3
We prove that solutions to the Monge-Ampere inequality $$\det D^2u \geq 1$$ in $\mathbb{R}^n$ are strictly convex away from a singular set of Hausdorff $n-1$ dimensional measure zero. Furthermore, we show this is optimal by constructing solutions to $\det D^2u = 1$ with singular set of Hausdorff dimension as close as we like to $n-1$. As a consequence we obtain $W^{2,1}$ regularity for the Monge-Ampere equation with bounded right hand side and unique continuation for the Monge-Ampere equation with sufficiently regular right hand side.
Comments: Final version, to appear in Comm. Pure Appl. Math
W^{2,1} estimate for singular solutions to the Monge-Ampere equation
Regularity of shadows and the geometry of the singular set associated to a Monge-Ampere equation
$C^\infty$ partial regularity of the singular set in the obstacle problem
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