Full flexibility of the Monge-Amp\`ere system in codimension d*-d+1
Abstract
We prove that C1,α solutions to the Monge-Amp\`ere system in dimension d and codimension k= d*-d+1, where d* denotes the Janet dimension, are dense in the space of continuous functions, for every H\"older exponent α<1. Our result strengthens the statement in [Lewicka 2022], obtained for k = 2d* and based on ideas from [K\"allen 1978] in the context of the isometric immersion system. It also generalizes the result of [Inauen-Lewicka 2025], where full flexibility was established in dimension d=2 and codimension k=2. The same proof scheme further yields local full flexibility of isometric immersions of d-dimensional Riemannian metrics into Euclidean space of dimension d* + 1, generalizing the result in [Lewicka 2025] proved for d=k=2. By using techniques of [Conti-De Lellis-Szekelyhidi], the result can be extended to compact manifolds, in codimension (d+1)d*-d+1.
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