Flexibility of Codimension One C1,θ Isometric Immersions
Abstract
We study the problem of constructing C1,θ isometric immersions of Riemannian metrics on n-dimensional domains into Rn+1. While the classical Nash--Kuiper theorem established the flexibility of C1 isometries, subsequent work has extended this to C1,θ isometries for certain θ, though the optimal exponent remains unknown. In this work we show that any short immersion can be uniformly approximated by C1,θ isometric immersions for θ< 1/(1+2(n-1)), improving upon the previously known exponent for n≥ 3. The improvement is obtained via a convex integration scheme incorporating a refined iterative integration by parts procedure resting on a detailed structural analysis of error terms and the interaction of multiple frequency scales.
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