On the Space lp+ = ∩lqq>p

## Abstract The present paper is devoted to study the transform by the index of the Legendre function which is known as the Mehler‐Fock transform. Mapping properties of the Mehler‐Fodr transform in the weighted space __L__~__p__~(ω(__t__); IR~+~) are given as the inversion formula. The image space

In this paper we present some basic results on the generalized Lebesgue spaces pŽ x . Ž . m, pŽ x . Ž . L ⍀ and generalized Lebesgue᎐Sobolev spaces W ⍀ . These results provide the necessary framework for the study of variational problems and elliptic Ž . equations with non-standard p x -growth cond

We analyze canonical operator space structures on the non-commutative L p spaces L p ' (M; ., |) constructed by interpolation a la Stein Weiss based on two normal semifinite faithful weights ., | on a W\*-algebra M. We show that there is only one canonical (i.e. arising by interpolation) operator sp

The paper contains sufficient conditions for multipliers in two types of quasi-BANACH spaces : (i) weighted &,-spaces of entire analytic functions of exponential type; O-=pz~'=--, (ii) BEsov'spaces Bi,q, where