Reflexive modules are not closed under submodules

We show that the two classes of reflexive modules with respect to a cotilting bimodule fail to be closed under submodules. More precisely, we show that any generalized Kronecker algebra A of infinite dimension has the following property: _AA_A is a cotilting bimodule, and any faithful module M such that M is reflexive with respect to _AA_A has a non reflexive socle.