Bounded Mean Oscillation: an R-Function with Multi-K6 Cubes. Dual of the Hardy Space H1 and Banach Extent

Abstract

This paper investigates the concept of harmonic functions of bounded mean oscillation, starting from John-Nirenberg's pioneering studies, under a renewed formalism, suitable for bringing out some fundamental properties inherent in it. In more detail: after a quick introduction, the second Section presents the main theorem, plus complete proof, relating to this function; in the third Section there is a suggestion on the exponential integrability (theorem and sketch of proof), while the fourth Section deals with the duality of Hardy Space H1 and bounded mean oscillation, with some ideas for a demonstration. The writing closes with a graphic appendix.

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