Some evaluations of the fractional p-Laplace operator on radial functions

Abstract

We face a rigidity problem for the fractional p-Laplace operator to extend to this new framework some tools useful for the linear case. It is known that (-)s(1-|x|2)s+ and -p(1-|x|pp-1) are constant functions in (-1,1) for fixed p and s. We evaluated (-p)s(1-|x|pp-1)s+ proving that it is not constant in (-1,1) for some p∈ (1,+∞) and s∈ (0,1). This conclusion is obtained numerically thanks to the use of very accurate Gaussian numerical quadrature formulas.

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