Two alternative proofs of weak Harnack inequality for mixed local and nonlocal p-Laplace equations with a nonhomogeneity

Abstract

We study a class of mixed local and nonlocal p-Laplace equations with prototype \[ -Δp u + (-Δp)s u = f in Ω, \] where Ω⊂ Rn is bounded and open. We provide sufficient condition on f to ensure weak Harnack inequality with a tail term for sign-changing supersolutions. Two different proofs are presented, avoiding the Krylov--Safonov covering lemma and expansion of positivity: one via the John--Nirenberg lemma, the other via the Bombieri--Giusti lemma. To our knowledge, these approaches are new, even for p = 2 with f 0, and include a new proof of the reverse Hölder inequality for supersolutions. Further, we establish Harnack inequality for solutions by first deriving a local boundedness result, together with a tail estimate and an initial weak Harnack inequality.