The boundary Harnack inequality for variable exponent p-Laplacian, Carleson estimates, barrier functions and p(·)-harmonic measures

Abstract

We investigate various boundary decay estimates for p(·)-harmonic functions. For domains in Rn, n≥ 2 satisfying the ball condition (C1,1-domains) we show the boundary Harnack inequality for p(·)-harmonic functions under the assumption that the variable exponent p is a bounded Lipschitz function. The proof involves barrier functions and chaining arguments. Moreover, we prove a Carleson type estimate for p(·)-harmonic functions in NTA domains in Rn and provide lower- and upper- growth estimates and a doubling property for a p(·)-harmonic measure.