Jacobian determinants for (nonlinear) gradient of planar ∞-harmonic functions and applications

Abstract

In dimension 2, we introduce a distributional Jacobian determinant DVβ(Dv) for the nonlinear complex gradient (x1,x2) |Dv|β(vx1,-vx2) for any β>-1, whenever v∈ W1,2 loc and β |Dv|1+β∈ W1,2loc. Then for any planar ∞-harmonic function u, we show that such distributional Jacobian determinant is a nonnegative Radon measure with some quantitative local lower and upper bounds. We also give the following two applications. (i) Applying this result with β=0, we develop an approach to build up a Liouville theorem, which improves that of Savin [33]. Precisely, if u is ∞-harmonic functions in whole R2 with R∞∈fc∈ R1 R3∫B(0,R)|u(x)-c|\,dx<∞, then u=b+a· x for some b∈ R and a∈ R2. (ii) Denoting by up the p-harmonic function having the same nonconstant boundary condition as u, we show that DVβ(Dup) DVβ(Du) as p∞ in the weak- sense in the space of Radon measure. Recall that Vβ(Dup) is always quasiregular mappings, but Vβ(Du) is not in general.