Characterization of multiplier spaces by wavelets and logarithmic Morrey spaces (Q435062)

The authors study the class of pointwise multipliers \(X_{m,p}\), from Sobolev spaces \(H^{m,p}(\mathbb R^n)\) to Lebesgue spaces \(L^p(\mathbb R^n)\) (both for the homogeneous and non-homogeneous cases).NEWLINENEWLINEOne of the main results of this paper shows that, if \(0<m<p<n/m\), the homogeneus multipliers class \(\dot{X}_{m,p}\) can be described as the set of functions in the Morrey space \(\dot{M}_{m,p}\) which satisfy a certain local wavelet discretization condition on dyadic cubes. Characterizations in terms of capacity conditions were already known.NEWLINENEWLINEFurthermore, a new class of logarithmic Morrey spaces is introduced, which gives sharper results that the known embeddings \(M_{m,q}\subset X_{m,p}\subset M_{m,p}\), \(p<q\), [\textit{C. Fefferman}, Bull. Am. Math. Soc., New Ser. 9, 129--206 (1983; Zbl 0526.35080)] and generalizes, to the non-integer case, the strict inclusion \(X_{m,p} \varsubsetneq M_{m,p}\), (see [\textit{P. G. Lemarié-Rieusset}, Recent developments in the Navier-Stokes problem. Chapman \& Hall/CRC Research Notes in Mathematics 431. Boca Raton, FL (2002; Zbl 1034.35093)] for the case \(n-mp\in\mathbb N\)).