Let Ω ⊂ Rn be of finite Lebesgue measure and 1 0 is embedded in the space L(p(Ω), which again is embedded in Lp(Ω). We present a way to find their norms which are based on the decreasing rearrangement. To get there, we define specific extrapolation and interpolation constructions and use them, alone and in combination, in order to characterise the spaces. Finally, we compare them to Lorentz-Zygmund spaces
