Topological properties of solution sets of Lipschitzian quantum stochastic differential inclusions (Q2467530)

The author continues his studies on the characterization of solutions of quantum stochastic differential equations. In this article, a continuous classification in terms of matrix elements of the process is obtained. For a more detailed descritption, we refer to the authors abstract: We establish a continuous mapping of the space of the matrix elements of an arbitrary nonempty set of quasi solutions of Lipschitzian quantum stochastic differential inclusion (QSDI) into the space of the matrix elements of its solutions. As a corollary, we furnish a generalization of a previous selection result. In particular, when the coefficients of the inclusion are integrably bounded, we show that the space of the matrix elements of solutions is an absolute retract, contractible, locally and integrally connected in an arbitrary dimension.