A note on the isomorphism of Cartesian products of ergodic flows

Abstract: We show an isomorphism stability property for Cartesian products of either flows with joining primeness property or flows which are α-weakly mixing.

“…We generalize one of the facts from [5] on the isomorphism of flows and give a negative response to the mentioned question in the situation where systems are not required to both be ergodic. We first start with these examles.…”

“…Main result. In [5], in particular, it is proved that the isomorphism of flows S t ⊗ S t T t ⊗ T t implies the isomorphism of the flows S t and T t , if the flow T t has a weak limit in the form R T a dν(a), where ν is a continuous mesure on R with analytical Fourier transform. We shall show that this last condition is not necessary.…”

Thouvenot’s Isomorphism Problem for Tensor Powers of Ergodic Flows

“…We generalize one of the facts from [5] on the isomorphism of flows and give a negative response to the mentioned question in the situation where systems are not required to both be ergodic. We first start with these examles.…”

“…Main result. In [5], in particular, it is proved that the isomorphism of flows S t ⊗ S t T t ⊗ T t implies the isomorphism of the flows S t and T t , if the flow T t has a weak limit in the form R T a dν(a), where ν is a continuous mesure on R with analytical Fourier transform. We shall show that this last condition is not necessary.…”

Thouvenot’s Isomorphism Problem for Tensor Powers of Ergodic Flows

Задача Тувено Об Изоморфизме Тензорных Степеней Эргодических Потоков