Nonlinear parabolic thin sets and parabolic Wolff inequalities
Abstract
We prove a parabolic analogue of Wolff's inequality adapted to the intrinsic scaling δc(x,t)=(cx,c2t) and formulated in terms of time-backward parabolic dyadic rectangles. As a consequence, we obtain equivalent characterizations of parabolic (α,q)-thinness in this geometric setting and establish the associated Kellogg and Choquet properties. We further use the notion of (α,2)-thinness defined in terms of fractional heat balls and prove that the sets of irregular boundary points z0∈∂ for the heat operator ∂t- and for the degenerate operator La=∂t(|y|a·)-div(|y|a∇·) in ⊂Rd+1 are negligible with respect to the thermal capacity cap T and the parabolic Bessel capacity Cα,2, respectively.
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