In this paper we prove a characterization theorem on the existence of one non-zero strong solution for elliptic equations defined on the Sierpinski gasket. More generally, the validity of our result can be checked studying elliptic equations defined on self-similar fractal domains whose spectral dimension nu is an element of (0, 2). Our theorem can be viewed as an elliptic version on fractal domains of a recent contribution obtained in a recent work of Ricceri for a two-point boundary value problem.

A characterization for elliptic problems on fractal sets

Molica Bisci G;
2015-01-01

Abstract

In this paper we prove a characterization theorem on the existence of one non-zero strong solution for elliptic equations defined on the Sierpinski gasket. More generally, the validity of our result can be checked studying elliptic equations defined on self-similar fractal domains whose spectral dimension nu is an element of (0, 2). Our theorem can be viewed as an elliptic version on fractal domains of a recent contribution obtained in a recent work of Ricceri for a two-point boundary value problem.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11576/2664306
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