The sub-elliptic obstacle problem: C1,α regularity of the free boundary in Carnot groups of step two
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- 作者:Donatella Danielli ; Nicola Garofalo ; Arshak Petrosyan
- 关键词:Sub-elliptic obstacle problem ; Carnot groups ; Regularity of free boundary ; NTA domains
- 刊名:Advances in Mathematics
- 出版年:2007
- 出版时间:1 June 2007
- 年:2007
- 卷:211
- 期:2
- 页码:485-516
- 全文大小:270 K
文摘
The sub-elliptic obstacle problem arises in various branches of the applied sciences, e.g., in mechanical engineering and robotics, mathematical finance, image reconstruction and neurophysiology. In the recent paper [Donatella Danielli, Nicola Garofalo, Sandro Salsa, Variational inequalities with lack of ellipticity. I. Optimal interior regularity and non-degeneracy of the free boundary, Indiana Univ. Math. J. 52 (2) (2003) 361–398; MR1976081 (2004c:35424)] it was proved that weak solutions to the sub-elliptic obstacle problem in a Carnot group belong to the Folland–Stein (optimal) Lipschitz class (the analogue of the well-known interior local regularity for the classical obstacle problem). However, the regularity of the free boundary remained a challenging open problem. In this paper we prove that, in Carnot groups of step r=2, the free boundary is (Euclidean) C1,α near points satisfying a certain thickness condition. This constitutes the sub-elliptic counterpart of a celebrated result due to Caffarelli [Luis A. Caffarelli, The regularity of free boundaries in higher dimensions, Acta Math. 139 (3–4) (1977) 155–184; MR0454350 (56 #12601)].