Shift Automorphisms of the Hyperfinite Factor

Let T be a free ergodic measure-preserving action of an abelian group G on ðX ; mÞ: The crossed product algebra R T ¼ L 1 ðX ; mÞs G has two distinguished masas, the image C T of L 1 ðX ; mÞ and the algebra S T generated by the image of G: We conjecture that conjugacy of the singular masas S T ð1Þ a

Let A be the generic dynamics factor. Since A is a quotient of the Borel\*envelope of the Fermion algebra it is hyperfinite. Let Out A s Aut ArInn A be the outer automorphism group of A. Among other more general results it is shown that every countable group can be isomorphically embedded in Out A;

In this paper we give explicit factorizations which demonstrate the stable tameness of all polynomial automorphisms arising from a recent construction of Hubbers and van den Essen. This is accomplished by two different factorizations of such an automorphism by triangular automorphisms, one which is