On a variational problem of nematic liquid crystal droplets
Abstract
Let μ>0 be a fixed constant, and we prove that minimizers to the following energy functional align* Ef(u,):=∫|∇ u|2+μ P() align*exist among pairs (,u) such that is an M-uniform domain with finite perimeter and fixed volume, and u ∈ H1(,S2) with u =, the measure-theoretical outer unit normal, almost everywhere on the reduced boundary of . The uniqueness of optimal configurations in various settings is also obtained. In addition, we consider a general energy functional given by align* Ef(u,):=∫ |∇ u(x)|2 \,dx + ∫∂* f(u(x)· (x)) \,dH2(x), align*where ∂* is the reduced boundary of and f is a convex positive function on R. We prove that minimizers of Ef also exist among M-uniform outer-minimizing domains with fixed volume and u ∈ H1(,S2).
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