We study a free interface problem of finding the optimal energy configuration for mixtures of two conducting materials with an additional perimeter penalization of the interface. We employ the regularity theory of linear elliptic equations to study the possible opening angles of Taylor cones and to give a different proof of a partial regularity result by Fan Hua Lin [Calc Var. Partial Differential Equations, 1993].
On the regularity of critical and minimal sets of a free interface problem / Fusco, Nicola; V., Julin. - In: INTERFACES AND FREE BOUNDARIES. - ISSN 1463-9963. - 17:(2015), pp. 117-142. [10.4171/IFB/336]
On the regularity of critical and minimal sets of a free interface problem
FUSCO, NICOLA;
2015
Abstract
We study a free interface problem of finding the optimal energy configuration for mixtures of two conducting materials with an additional perimeter penalization of the interface. We employ the regularity theory of linear elliptic equations to study the possible opening angles of Taylor cones and to give a different proof of a partial regularity result by Fan Hua Lin [Calc Var. Partial Differential Equations, 1993].File in questo prodotto:
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