Green's function for the fractional KdV equation on the periodic domain via Mittag-Leffler's function
Abstract
The linear operator c + (-)α/2, where c > 0 and (-)α/2 is the fractional Laplacian on the periodic domain, arises in the existence of periodic travelling waves in the fractional Korteweg--de Vries equation. We establish a relation of the Green's function of this linear operator with the Mittag--Leffler function, which was previously used in the context of Riemann--Liouville's and Caputo's fractional derivatives. By using this relation, we prove that Green's function is strictly positive and single-lobe (monotonically decreasing away from the maximum point) for every c > 0 and every α ∈ (0,2]. On the other hand, we argue from numerical approximations that in the case of α ∈ (2,4], the Green's function is positive and single-lobe for small c and non-positive and non-single lobe for large c.
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