A view from above on JNp(Rn)

Abstract

For a symmetric convex body K⊂Rn and 1 p<∞, we define the space Sp(K) to be the tent generalization of JNp(Rn), i.e., the space of all continuous functions f on the upper-half space R+n+1 such that \[ \|f\|Sp(K) := ( C Σx+tK ∈ C |f(x,t)|p )1p < ∞, \] where, in the above, the supremum is taken over all finite disjoint collections of homothetic copies of K. It is then shown that the dual of S10(K), the closure of the space of continuous functions with compact support in S1(K), consists of all Radon measures on R+n+1 with uniformly bounded total variation on cones with base K and vertex in Rn. In addition, a similar scale of spaces is defined in the dyadic setting, and for 1 p<∞, a complete characterization of their duals is given. We apply our results to study JNp spaces.

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