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In this research, we investigate a general shape optimization problem in which the state equation is expressed using a nonlocal and nonlinear operator. We prove the existence of a minimum point for a functional F defined on the family of all 'quasi-open' subsets of a bounded open set in Rⁿ. This is ensured under the condition that F demonstrates decreasing behavior concerning set inclusion and is lower semicontinuous with respect to a suitable topology associated with the fractional p-Laplacian under Dirichlet boundary conditions. Moreover, we study the asymptotic behavior of the solutions when s1 and extend this result to the anisotropic case.
Ignacio Ceresa Dussel (Wed,) studied this question.