Littlewood-Paley-Stein functionals: an R-boundedness approach

Abstract

Let L = + V be a Schr\"odinger operator with a non-negative potential V on a complete Riemannian manifold M. We prove that the vertical Littlewood-Paley-Stein functional associated with L is bounded on Lp(M) if and only if the set \t\, ∇ e-tL, \, t > 0\ is R-bounded on Lp(M). We also introduce and study more general functionals. For a sequence of functions mk : [0, ∞) C, we define H((fk)) := ( Σk ∫0∞ | ∇ mk(tL) fk |2 dt )1/2 + ( Σk ∫0∞ | V mk(tL) fk |2 dt )1/2. Under fairly reasonable assumptions on M we prove boundedness of H on Lp(M) in the sense \| H((fk)) \|p C\, \| ( Σk |fk|2 )1/2 \|p for some constant C independent of (fk)k. A lower estimate is also proved on the dual space Lp'. We introduce and study boundedness of other Littlewood-Paley-Stein type functionals and discuss their relationships to the Riesz transform. Several examples are given in the paper.