Oscillatory Phenomena for Higher-Order Fractional Laplacians

Abstract

We collect some peculiarities of higher-order fractional Laplacians (-)s, s>1, with special attention to the range s∈(1,2), which show their oscillatory nature. These include the failure of the polarization and P\'olya-Szeg\"o inequalities and the explicit example of a domain with sign-changing first eigenfunction. In spite of these fluctuating behaviours, we prove how the Faber-Krahn inequality still holds for any s>1 in dimension one.

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