Two-state free Brownian motions

Abstract

In a two-state free probability space (A, φ, ), we define an algebraic two-state free Brownian motion to be a process with two-state freely independent increments whose two-state free cumulant generating function is quadratic. Note that a priori, the distribution of the process with respect to the second state is arbitrary. We show, however, that if A is a von Neumann algebra, the states φ, are normal, and φ is faithful, then there is only a one-parameter family of such processes. Moreover, with the exception of the actual free Brownian motion (corresponding to φ = ), these processes only exist for finite time.