On the R-boundedness of stochastic convolution operators

Abstract

The R-boundedness of certain families of vector-valued stochastic convolution operators with scalar-valued square integrable kernels is the key ingredient in the recent proof of stochastic maximal Lp-regularity, 2<p<∞, for certain classes of sectorial operators acting on spaces X=Lq(μ), 2 q<∞. This paper presents a systematic study of R-boundedness of such families. Our main result generalises the afore-mentioned R-boundedness result to a larger class of Banach lattices X and relates it to the 1-boundedness of an associated class of deterministic convolution operators. We also establish an intimate relationship between the 1-boundedness of these operators and the boundedness of the X-valued maximal function. This analysis leads, quite surprisingly, to an example showing that R-boundedness of stochastic convolution operators fails in certain UMD Banach lattices with type 2.