Towards spaces of harmonic functions with traces in square Campanato space and its scaling invariant

Abstract

For n 1 and α∈ (-1,1), let Hα,2 be the space of harmonic functions u on the upper half space Rn+1+ satisfying (x0,r)∈ Rn+1+r-(2α+n)∫B(x0,r)∫0r|∇x,t u(x,t)|2t\,dt\,dx<∞, and L2,n+2α be the Campanato space on Rn. We show that Hα,2 coincide with e-t-L2,n+2α for all α∈ (-1,1), where the case α∈ [0,1) was originally discovered by Fabes, Johnson and Neri [Indiana Univ. Math. J. 25 (1976), 159-170] and yet the case α∈ (-1,0) was left open. Moreover, for the scaling invariant version of Hα,2, Hα,2, which comprises all harmonic functions u on Rn+1+ satisfying (x0,r)∈ Rn+1+r-(2α+n)∫B(x0,r) ∫0r|∇x,t u(x,t)|2\,t1+2α \,dt\,dx<∞, we show that Hα,2=e-t-(-)α2L2,n+2α, where (-)α2L2,n+2α is the collection of all functions f such that (-)-α2f are in L2,n+2α. Analogues for solutions to the heat equation are also established. As an application, we show that the spaces ((-)α2L2,n+2α)-1 unify Qα-1, BMO-1 and B-1,∞∞ naturally.