Hölder maps under Pfaffian constraints
Abstract
Given a one form λ in RN and f: Sn RN with f λ= 0 we discuss the maximal Hölder regularity of extensions F: Bn+1 RN such that Fλ= 0 in distributional sense. Our analysis applies to the Heisenberg groups Hn. It implies in particular that for all n ≥ 1 any smooth horizontal map f: Sn Hn can be extended to a Cα-map F: Bn+1 Hn for some α> 1/2. Moreover, if n ≥ 3 we find Cα-embeddings from Bn+1 into Hn for some α> 12.
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