The UMD property for Musielak--Orlicz spaces
arXiv:1810.13362
Abstract
In this paper we show that Musielak--Orlicz spaces are UMD spaces under the so-called $Î_2$ condition on the generalized Young function and its complemented function. We also prove that if the measure space is divisible, then a Musielak--Orlicz space has the UMD property if and only if it is reflexive. As a consequence we show that reflexive variable Lebesgue spaces $L^{p(\cdot)}$ are UMD spaces.
minor revision