Fractional Vector-Valued Littlewood-Paley-Stein Theory for Semigroups

Abstract

We consider the fractional derivative of a general Poisson semigroup. With this fractional derivative we define the generalized fractional Littlewood-Paley g-function for semigroups acting on Lp-spaces of functions with values in Banach spaces. We give a characterization of the classes of Banach spaces for which the fractional Litlewood-Paley g-function is bounded on Lp-spaces. We show that the class of Banach spaces is independent of the order of derivation and coincides with the classical (Lusin type/cotype) case. It is also shown that the same kind of results exist for the case of the fractional area function and the fractional g*λ-function on Rn. At last, we consider the relationship of the almost sure finiteness of the fractional Littlewood-Paley g-function, area function and g*λ-function with the Lusin cotype property of the underlying Banach space. As a byproduct of the techniques developed, one can get some results of independent interest for vector-valued Calder\'on--Zygmund operators. For example, one can get the following characterization, a Banach space B is UMD if and only if for some (or, equivalently, for every) p∈ [1,∞), ε → 0 ∫|x-y|> ε f(y)x-ydy exists a.e. x∈ R for every f∈ LpB(R).