On the interpolation constant for subadditive operators in Orlicz spaces

Abstract

Let 1 p<q∞ and let T be a subadditive operator acting on Lp and Lq. We prove that T is bounded on the Orlicz space Lφ, where φ-1(u)=u1/p(u1/q-1/p) for some concave function and \[ \|T\|Lφ Lφ C\\|T\|Lp Lp,\|T\|Lq Lq\. \] The interpolation constant C, in general, is less than 4 and, in many cases, we can give much better estimates for C. In particular, if p=1 and q=∞, then the classical Orlicz interpolation theorem holds for subadditive operators with the interpolation constant C=1. These results generalize our results for linear operators obtained in KM01.