General least gradient problems with obstacle

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Fotouhi, M ; Sharif University of Technology | 2019

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Type of Document: Article
DOI: 10.1007/s00526-019-1635-8
Publisher: Springer New York LLC , 2019
Abstract:
We study existence, structure, uniqueness and regularity of solutions of the obstacle problem infu∈BVf(Ω)∫Ωϕ(x,Du),where BVf(Ω)={u∈BV(Rn):u≥ψinΩandu|∂Ω=f|∂Ω}, f∈W01,1(Rn), ψ is the obstacle, and ϕ(x, ξ) is a convex, continuous and homogeneous function of degree one with respect to the ξ variable. We show that every minimizer of this problem is also a minimizer of the least gradient problem infu∈Af(Ω)∫Rnϕ(x,Du),where Af(Ω)={u∈BV(Ω):u≥ψ,andu=finΩc}. Moreover, there exists a vector field T with ∇ · T≤ 0 in Ω which determines the structure of all minimizers of these two problems, and T is divergence free on { x∈ Ω : u(x) > ψ(x) } for any minimizer u. We also present uniqueness and regularity results that are based on maximum principles for minimal surfaces. Since minimizers of the least gradient problems with obstacle do not hit small enough obstacles, the results presented in this paper extend several results in the literature about least gradient problems without obstacle. © 2019, Springer-Verlag GmbH Germany, part of Springer Nature
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Source: Calculus of Variations and Partial Differential Equations ; Volume 58, Issue 5 , 2019 ; 09442669 (ISSN)
URL: https://link.springer.com/article/10.1007/s00526-019-1635-8