Approximation in the Zygmund and H\"older classes on Rn

Abstract

We determine the distance (up to a multiplicative constant) in the Zygmund class (Rn) to the subspace J(bmo)(Rn). The latter space is the image under the Bessel potential J := (1-)-1/2 of the space bmo(Rn), which is a non-homogeneous version of the classical BMO. Locally, J(bmo)(Rn) consists of functions that together with their first derivatives are in bmo(Rn). More generally, we consider the same question when the Zygmund class is replaced by the H\"older space s(Rn), with 0 < s ≤ 1 and the corresponding subspace is Js(bmo)(Rn), the image under (1-)-s/2 of bmo(Rn). One should note here that 1(Rn) = (Rn). Such results were known earlier only for n = s = 1 with a proof that does not extend to the general case. Our results are expressed in terms of second differences. As a byproduct of our wavelet based proof, we also obtain the distance from f ∈ s(Rn) to Js(bmo)(Rn) in terms of the wavelet coefficients of f. We additionally establish a third way to express this distance in terms of the size of the hyperbolic gradient of the harmonic extension of f on the upper half-space Rn+1+.