A Carleson problem for the Boussinesq operator

Abstract

In this paper, Theorems 1.1- 1.2 show that the Boussinesq operator Btf converges pointwise to its initial data f∈ Hs(R) as t 0 provided s≥14 -- more precisely -- on the one hand, by constructing a counterexample in R we discover that the optimal convergence index sc,1=14; on the other hand, we find that the Hausdorff dimension of the disconvergence set for Btf is align* α1,B(s)&=cases 1-2s&\ \ as\ \ 14≤ s≤12;\\ 1 &\ \ as\ \ 0<s<14. cases align* Moreover, Theorem 1.3 presents a higher dimensional lift of Theorems 1.1- 1.2 under f being radial.