On interpolation of some quasi-Banach spaces (Q757796)

It has been observed, some 20 years ago, that with the use of the Aoki- Rolewicz theorem, real interpolation theory can be carried out in the context of quasi-Banach spaces. Since a number of important spaces in Analysis, \(H^ p\) spaces are the most generally known, are quasi Banach spaces, this is a useful generalization. In fact, even parts of complex interpolation theory which seems hopelessly dependent on Banach space structure (unlike Banach space valued, quasi-Banach valued analytic functions need not satisfy the maximum principle) can be handled by use of a mixed (real-complex) reiteration theorem and appropriate results for the real theory. The author continues the useful work of extending various results, well understood in the Banach case, to the quasi-Banach setting.