On the fundamental theorem of submanifold theory and isometric immersions with supercritical low regularity
Abstract
A fundamental result in global analysis and nonlinear elasticity asserts that given a solution S to the Gauss--Codazzi--Ricci equations over a simply-connected closed manifold (Mn,g), one may find an isometric immersion of (Mn,g) into the Euclidean space Rn+k whose extrinsic geometry coincides with S. Here the dimension n and the codimension k are arbitrary. Abundant literature has been devoted to relaxing the regularity assumptions on S and . The best result up to date is S ∈ Lp and ∈ W2,p for p>n ≥ 3 or p=n=2. In this paper, we extend the above result to ∈ X whose topology is strictly weaker than W2,n for n ≥ 3. Indeed, X is the weak Morrey space Lp, n-p2,w with arbitrary p ∈ ]2,n]. This appears to be first supercritical result in the literature on the existence of isometric immersions with low regularity, given the solubility of the Gauss--Codazzi--Ricci equations. Our proof essentially utilises the theory of Uhlenbeck gauges -- in particular, Rivi\`ere--Struwe's work [Partial regularity for harmonic maps and related problems, Comm. Pure Appl. Math. 61 (2008)] on harmonic maps in arbitrary dimensions and codimensions -- and compensated compactness.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.