Some examples of equivalent rearrangement-invariant quasi-norms defined via f* or f**
Abstract
We consider Lorentz-Karamata spaces, small and grand Lorentz-Karamata spaces, and the so-called L, R, LL, RL, RL, and RR spaces. The quasi-norms for a function f in each of these spaces can be defined via the non-increasing rearrangement f* or via the maximal function f**. We investigate when these quasi-norms are equivalent. Most of the proofs are based on Hardy-type inequalities. As application we demonstrate how our general results can be used to establish interpolation formulae for the grand and small Lorentz-Karamata spaces.
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