John--Nirenberg--Campanato Spaces

Abstract

Let p∈ (1,∞), q∈[1,∞), α∈ [0,∞) and s be a non-negative integer. In this article, the authors introduce the John--Nirenberg-Campanato space JN(p,q,s)α(X), where X is Rn or any closed cube Q0⊂neqq Rn, which when α=0 and s=0 coincides with the JNp-space introduced by F. John and L. Nirenberg in the sense of equivalent norms. The authors then give the predual space of JN(p,q,s)α(X) and a John-Nirenberg type inequality of John--Nirenberg-Campanato spaces. Moreover, the authors prove that the classical Campanato space serves as a limit space of JN(p,q,s)α(X) when p ∞.