Sparse Brudnyi and John-Nirenberg Spaces

Abstract

A generalization of the theory of Y. Brudnyi yuri, and A. and Y. Brudnyi BB20a, BB20b, is presented. Our construction connects Brudnyi's theory, which relies on local polynomial approximation, with new results on sparse domination. In particular, we find an analogue of the maximal theorem for the fractional maximal function, solving a problem proposed by Kruglyak--Kuznetsov. Our spaces shed light on the structure of the John--Nirenberg spaces. We show that SJNp (sparse John--Nirenberg space) coincides with Lp,1<p<∞. This characterization yields the John--Nirenberg inequality by extrapolation and is useful in the theory of commutators.