Principal curves to fractional m-Laplacian systems and related maximum and comparison principles
Abstract
In this paper we develop a comprehensive study on principal eigenvalues and both the (weak and strong) maximum and comparison principles related to an important class of nonlinear systems involving fractional m-Laplacian operators. Explicit lower bounds for principal eigenvalues of this system in terms of the diameter of are also proved. As application, given λ,μ≥ 0 we measure explicitly how small has to be diam() so that weak and strong maximum principles associated to this problem hold in .
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