Maximal regularity for stochastic convolutions in \(L^p\) spaces (Q1287016)

This note deals with analytic semigroups in Banach spaces where the Burkholder inequality holds true with some \(p\geq 1\). It is proved that the related stochastic convolution is continuous from the space of \(L^p\)-integrable adapted stochastic processes with values in some interpolation space to the space of \(L^p\)-integrable adapted processes with values in another associated interpolation space.