On the Bourgain--Brezis--Mironescu spaces over Carleson tents

Abstract

We introduce Carleson analogs of the Bourgain--Brezis--Mironescu spaces B and B0 by measuring mean oscillation over upper Carleson tents. For these spaces, denoted by B Cp and B C,0p, we prove two types of structural results. First, we show that they contain several natural classes of functions, including BMO/VMO--Carleson spaces, tent-space potential classes, and fractional Sobolev classes. Second, motivated by Zhu's structural theorem for BMO spaces induced by the Bergman metric, we establish decompositions of B Cp and B C,0p into bounded-oscillation and bounded-average components. We then revisit the Bourgain--Brezis--Mironescu rigidity phenomenon in the Carleson setting. Although the direct rigidity statement fails for B C,0p, we introduce a natural B Cp-trace and prove that the rigidity theorem survives at the level of traces.