New function classes of Morrey-Campanato type and their applications
Abstract
The aim of this paper is to introduce and investigative some new function classes of Morrey-Campanato type. Let 0<p<∞ and 0≤ λ<n+p. We say that f∈ Lp,λ() if x0∈ ,>0-λ∫(x0,)|f(x)-|f|(x0,)|pdx<∞, where (x0,)=Q(x0,) and Q(x,) is denote the cube of Rn. Some basic properties and characterizations of these classes are presented. If 0≤ λ<n, the space is equivalent to related Morrey space. If λ=n, then f ∈ Lp,n() if and only if f∈ BMO() with f-∈ L∞(), where f-=-\0,f\. If n<λ≤ n+p, the Lp,λ() functions establish an integral characterization of the nonnegative H\"older continue functions. As applications, this paper gives unified criterions on the necessity of bounded commutators of maximal functions.
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