C1,13- very weak solutions to the two dimensional Monge-Amp\'ere equation

Abstract

For any θ<13, we show that very weak solutions to the two-dimensional Monge-Amp\`ere equation with regularity C1,θ are dense in the space of continuous functions. This result is shown by a convex integration scheme involving a subtle decomposition of the defect at each stage. The decomposition diagonalizes the defect and, in addition, incorporates some of the leading-order error terms of the first perturbation, effectively reducing the required amount of perturbations to one.

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