A singular perturbation approach to the Dirichlet-area minimisation problem
Abstract
We study both one and two-phase minimisers of the Dirichlet-area energy E(v) = ∫B1 ∇ v2 + Per(\v>0\,B1). In the two-phase case, we show that the energies E(v) = ∫B1∇ v2 + 1W(v1/2), -converge to E as 0, where W is the double well potential extended by zero outside of [-1,1] . As a consequence, we show that bounded local minimisers of E converge to a local minimiser of E.
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