General Reiteration Theorems for R and L Clases: Mixed Interpolation of R and L-spaces

Abstract

Given E0, E1, F0, F1, E rearrangement invariant function spaces, a0, a1, b0, b1, b slowly varying functions and 0< θ0<θ1<1, we characterize the interpolation spaces (X Rθ0,b0,E0,a0,F0, X Rθ1, b1,E1,a1,F1)θ,b,E, (X Lθ0, b0,E0,a0,F0, X Lθ1,b1,E1,a1,F1)θ,b,E and (X Rθ0,b0,E0,a0,F0, X Lθ1, b1,E1,a1,F1)θ,b,E, (X Lθ0, b0,E0,a0,F0, X Rθ1,b1,E1,a1,F1)θ,b,E, for all possible values of θ∈[0,1]. Applications to interpolation identities for grand and small Lebesgue spaces, Gamma spaces and A and B-type spaces are given.