Goal of this paper is to study the asymptotic behaviour of the solutions of the following doubly nonlocal equation (−Δ)su+μu=(Iα∗F(u))f(u)onRNwhere s∈(0,1), N≥2, α∈(0,N), μ>0, Iα denotes the Riesz potential and F(t)=∫0tf(τ)dτ is a general nonlinearity with a sublinear growth in the origin. The found decay is of polynomial type, with a rate possibly slower than [Formula presented], and it complements the decays obtained in the linear and superlinear cases in Cingolani et al. (2022); D'Avenia et al. (2015). Differently from the local case s=1 in Moroz and Van Schaftingen (2013), new phenomena arise connected to a new “s-sublinear” threshold that we detect on the growth of f. To gain the result we in particular prove a Chain Rule type inequality in the fractional setting, suitable for concave powers.
Gallo, M., Asymptotic decay of solutions for sublinear fractional Choquard equations, <<NONLINEAR ANALYSIS>>, 2024; 242 (113515): 1-21. [doi:10.1016/j.na.2024.113515] [https://hdl.handle.net/10807/268559]
Asymptotic decay of solutions for sublinear fractional Choquard equations
Gallo, Marco
Primo
2024
Abstract
Goal of this paper is to study the asymptotic behaviour of the solutions of the following doubly nonlocal equation (−Δ)su+μu=(Iα∗F(u))f(u)onRNwhere s∈(0,1), N≥2, α∈(0,N), μ>0, Iα denotes the Riesz potential and F(t)=∫0tf(τ)dτ is a general nonlinearity with a sublinear growth in the origin. The found decay is of polynomial type, with a rate possibly slower than [Formula presented], and it complements the decays obtained in the linear and superlinear cases in Cingolani et al. (2022); D'Avenia et al. (2015). Differently from the local case s=1 in Moroz and Van Schaftingen (2013), new phenomena arise connected to a new “s-sublinear” threshold that we detect on the growth of f. To gain the result we in particular prove a Chain Rule type inequality in the fractional setting, suitable for concave powers.File | Dimensione | Formato | |
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