Bourgain-Brezis spaces obtained by real interpolation

Abstract

In 2002, Bourgain and Brezis proved that for the space X=W1,d (on Td, with d≥2) we have the equality of images equation div (L∞ X)=div X, equation i.e., given a vector field v∈ X there exists a vector field u∈ L∞ X such that div u=div] v . In this paper we show that if X is a function space satisfying () then, any real interpolation space Xθ,q=(L∞,X)θ,q (where θ∈ (0,1) and q∈ [1,∞)) also satisfies (). The proof is based on a general method that allows us to interpolate solutions of linear equations.