Robust interpolation inequalities via Chebyshev-type integral inequalities

Abstract

We establish robust log-convex interpolation inequalities within the scale of Gagliardo seminorms. We achieve this by deriving some Chebyshev-type integral inequalities for general non-synchronous functions. Our primary motivation for establishing these robust interpolation inequalities stems from the study of the asymptotic nonlocal-to-local stability of weak solutions to the boundary Dirichlet problem associated with the regional fractional p-Laplacian. More precisely, if us ∈ Ws,p(Ω) weakly satisfies (-Δ)p, Ωs us = fs in Ω and γs0(us) = gs on ∂Ω, with 1p < s ≤ 1 and Ω⊂ Rd is bounded Lipschitz, then, under appropriate convergence of the data fs and gs as s 1-, we establish that \| us - u1 \|Wη,p(Ω) s 1- 0 for all 0 ≤ η< 1.