Nontrivial examples of JNp and VJNp functions

Abstract

We study the John-Nirenberg space JNp, which is a generalization of the space of bounded mean oscillation. In this paper we construct new JNp functions, that increase the understanding of this function space. It is already known that Lp(Q0) ⊂neq JNp(Q0) ⊂neq Lp,∞(Q0). We show that if |f|1/p ∈ JNp(Q0), then |f|1/q ∈ JNq(Q0), where q ≥ p, but there exists a nonnegative function f such that f1/p JNp(Q0) even though f1/q ∈ JNq(Q0), for every q ∈ (p,∞). We present functions in JNp(Q0) VJNp(Q0) and in VJNp(Q0) Lp(Q0), proving the nontriviality of the vanishing subspace VJNp, which is a JNp space version of VMO. We prove the embedding JNp(Rn) ⊂ Lp,∞(Rn)/R. Finally we show that we can extend the constructed functions into Rn, such that we get a function in JNp(Rn) VJNp(Rn) and another in CJNp(Rn) Lp(Rn)/R. Here CJNp is a subspace of JNp that is inspired by the space CMO.