The distance from functions in BMO to BLO

Abstract

Let BMO and BLO denote the spaces of all locally integrable real-valued functions on Rn with bounded mean oscillation and bounded lower oscillation, respectively. It is well known that L∞(Rn)⊂neqq BLO⊂neqq BMO. In 1978, Garnett and Jones gave distance formulas of f∈ BMO to L∞(Rn) and recently, Angrisani studied the distance of f∈ BLO to L∞(Rn). In this paper, we characterize the distance from any given function f ∈ BMO to BLO via the Muckenhoupt weight class Ap as follows center dist\,(f,\ BLO)\,∈f\ξ∈(0,∞):\ e- fξ∈ Ap\ for\ some\ p∈(1,∞)\. center Two equivalent representations of this distance are also established in terms of exponential form and the infimum of the constant in a variant of John--Nirenberg inequality, respectively.