Abstract:
We prove a characterization of relative weak mixing in W*-dynamical systems in terms of a relatively independent joining. We then define a noncommutative version of relative discrete spectrum, show that it generalizes
both the classical and noncommutative absolute cases and give examples.
Chapter 1 reviews the GNS construction for normal states, the related
semicyclic representation on von Neumann algebras, Tomita-Takasaki theory and conditional expectations. This will allow us to define, in the tracial case, the basic construction of Vaughan Jones and its associated lifted
trace. Dynamics is introduced in the form of automorphisms on von Neumann algebras, represented using the cyclic and separating vector and then
extended to the basic construction.
In Chapter 2, after introducing a relative product system, we discuss
relative weak mixing in the tracial case. We give an example of a relative
weak mixing W*-dynamical system that is neither ergodic nor asymptotically abelian, before proving the aforementioned characterization.
Chapter 3 defines relative discrete spectrum as complementary to relative weak mixing. We motivate the definition using work from Chapter 2.
We show that our definition generalizes the classical and absolute noncommutative case of isometric extensions and discrete spectrum, respectively.
The first example is a skew product of a classical system with a noncommutative one. The second is a purely noncommutative example of a tensor
product of a W*-dynamical system with a finite-dimensional one.
