Fractional Heat Semigroup Characterization of Distances from Functions in Lipschitz Spaces to Their Subspaces

Abstract

Let s denote the inhomogeneous Lipschitz space of order s∈(0,∞) on Rn. This article characterizes the distance d(f, V)_s: = ∈fg∈ V \|f-g\|_s from a function f∈ s to a non-dense subspace V⊂ s via the fractional semigroup \Tα, t: =e-t (-)α/2: t∈ (0, ∞)\ for any α∈(0,∞). Given an integer r >s/α, a uniformly bounded continuous function f on Rn belongs to the space s if and only if there exists a constant λ∈(0,∞) such that align* |(-) α r2 (Tα, tα f)(x) |≤ λ ts -rα \ \ for any x∈Rn and t∈ (0, 1].align* The least such constant is denoted by λ α, r, s(f). For each f∈ s and 0<< λα,r, s(f), let Dα, r(s,f,):=\ (x,t)∈ Rn× (0,1]:\ | (-) α r2 (Tα, tα f)(x) |> ts -r α \ be the set of ``bad'' points. To quantify its size, we introduce a class of extended nonnegative admissible set functions on the Borel σ-algebra B(Rn× [0, 1]) and define, for any admissible function , the critical index α, r, s,(f):=∈f\∈(0,∞):\ (Dα, r(s,f,))<∞\. Our result shows that, for a broad class of subspaces V⊂ s, including intersections of s with Sobolev, Besov, Triebel--Lizorkin, and Besov-type spaces, there exists an admissible function depending on V such that α, r, s,(f) dist(f, V)_s.