Construction of harmonic coordinates for weak immersions
Abstract
We prove that any weak immersion in the critical Sobolev space Wn2+1,2(Rn;Rd) in even dimension n≥ 4, has global harmonic coordinates if its second fundamental form is small in the Sobolev space Wn2-1,2(Rn;Rd). This is a generalization to arbitrary even dimension n 4 of a famous result of M\"uller--Sverak muller1995 for n=2. The existence of such coordinates is a key tool used by the authors in MarRiv20252 for the analysis of scale-invariant Lagrangians of immersions, such as the Graham--Reichert functional. From a purely intrinsic perspective, the proof of the main result leads to a general local existence theorem of harmonic coordinates for general metrics with Riemann tensor in Lp for any p>n/2 in any dimension n≥ 3.
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