A note on Hopf's lemma and strong minimum principle for nonlocal equations with non-standard growth
Abstract
Let ⊂ Rn be any open set and u be a weak supersolution of Lu=c(x)g(|u|)u|u| where \[Lu(x)=p.v. ∫Rn g(|u(x)-u(y)||x-y|s) u(x)-u(y)|u(x)-u(y)| K(x,y)dy|x-y|s\] and g=G for some Young function G. This note imparts a Hopf's type lemma and strong minimum principle for u when c(x) is continuous in that extend the results of Del Pezzo and Quaas (JDE-2017) in fractional Orlicz-Sobolev setting.
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