ODE-methods in non-local equations
Abstract
Non-local equations cannot be treated using classical ODE theorems. Nevertheless, several new methods have been introduced in the non-local gluing scheme of our previous article "On higher dimensional singularities for the fractional Yamabe problem: a non-local Mazzeo-Pacard program"; we survey and improve those, and present new applications as well. First, from the explicit symbol of the conformal fractional Laplacian, a variation of constants formula is obtained for fractional Hardy operators. We thus develop, in addition to a suitable extension in the spirit of Caffarelli--Silvestre, an equivalent formulation as an infinite system of second order constant coefficient ODEs. Classical ODE quantities like the Hamiltonian and Wro\'nskian may then be utilized. As applications, we obtain a Frobenius theorem and establish new Poho\vzaev identities. We also give a detailed proof for the non-degeneracy of the fast-decay singular solution of the fractional Lane-Emden equation.
Cite
@article{arxiv.1910.14512,
title = {ODE-methods in non-local equations},
author = {Weiwei Ao and Hardy Chan and Azahara DelaTorre and Marco A. Fontelos and María Del Mar González and Juncheng Wei},
journal= {arXiv preprint arXiv:1910.14512},
year = {2020}
}
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