On some Fr\'echet spaces associated to the functions satisfying Mulholland inequality

Abstract

In this article we explore a new growth condition on Young functions, which we call Mulholland condition, pertaining to the mathematician H.P Mulholland, who studied these functions for the first time, albeit in a different context. We construct a non-trivial Young function which satisfies Mulholland condition and 2-condition. We then associate exotic F-norms to the vector space X1 X2, where X1 and X2 are Banach spaces, using the function . This F-spaces contains the Banach space X1 and X2 as a maximal Banach subspace. Further, the Banach envelope (X1 X2,||.||_o) of this F-space corresponds to the Young function o who characteristic function is an asymptotic line to the characteristic function of the Young function . Thus these F-spaces serves as "interpolation space" for Banach spaces X1 and (X1 X2, ||.||_o) in some sense. These F-space are well behaved in regards to Hahn-Banach extension property, which is lacking in classical F-spaces like Lp and Hp for 0<p<1. Towards the end, some direct sums for Orlicz spaces are discussed.