Duality for outer Lpμ(r) spaces and relation to tent spaces

Abstract

We prove that the outer Lpμ(r) spaces, introduced by Do and Thiele, are isomorphic to Banach spaces, and we show the expected duality properties between them for 1 < p ≤ ∞, 1 ≤ r < ∞ or p=r ∈ \ 1, ∞ \ uniformly in the finite setting. In the case p=1, 1 < r ≤ ∞, we exhibit a counterexample to uniformity. We show that in the upper half space setting these properties hold true in the full range 1 ≤ p,r ≤ ∞. These results are obtained via greedy decompositions of functions in Lpμ(r). As a consequence, we establish the equivalence between the classical tent spaces Tpr and the outer Lpμ(r) spaces in the upper half space. Finally, we give a full classification of weak and strong type estimates for a class of embedding maps to the upper half space with a fractional scale factor for functions on Rd.