On Counterexamples to Interior C2 Estimates for Monge-Amp\`ere Type Equations
Abstract
We modify Pogorelov's classic construction to demonstrate the absence of a priori C2 estimates for the equations (D2 u Du Du) = f(x) in dimension n 3. We construct a sequence of solutions z with second derivatives blowing up at the origin as → 0, while the corresponding right-hand sides f admit uniform C2 estimates. Specifically, the counterexamples are given by z(x1, …, xn) = (1+x12)(1+x22)(2 + η2)α/2, where η = x32 + … + xn2 and α = 2 - 2n.
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