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Quasi-Flows II Additive Functionals and TQ-Systems

Published online by Cambridge University Press:  22 January 2016

Izumi Kubo
Izumi Kubo*
Affiliation:
Mathematical Institute, Nagoya University
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We have given in [3] the definition of the quasi-flow and discussed the representation and the time-change of the quasi-flow. Further we have defined the TQ-system and studied some properties of them using the time-change and the representation of the quasi-flow. These properties are very useful to study the ergodicity, the entropy and increasing partitions of the automorphism. We are now going to extend the definition of the TQ-system and to study the similar problems as the above.

Type
Research Article
Information
Nagoya Mathematical Journal , Volume 40 , December 1970 , pp. 39 - 66
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1970

References

[1] Ambrose, W. and Kakutani, S. Structure and continuity of measurable flow. Duke Math. J. 9(1942), 2542.Google Scholar
[2] Hopf, E. Ergodentheorie. Leipzig (1937).Google Scholar
[3] Kubo, I. Quasi-flows. Nagoya Math. J. 35(1969), 130.Google Scholar
[4] Kubo, I. Representation of quasi-flows with multi-dimensional parameter. Proceedings of the International Conference on Functional Analysis and Related Topics, 1969, 405413.Google Scholar
[5] Maruyama, G. Transformations of flows, J. Math. Soc. Japan, 18(1966), 290302.Google Scholar
[6] Rohlin, V.A. On the fundamental ideas of measure theory, Amer. Math. Soc. Transl. (I) 10(1962), 154.Google Scholar
[7] Sinai, Ya. G. Dynamical systems with countably-multiple Lebesgue spectrum. II, Amer. Math. Math. Soc. Transl. (2) 68(1968), 3468.Google Scholar
[8] Totoki, H. Time changes of flows, Mem. Fac. Sci. Kyushu Univ. 20(1966), 2755.Google Scholar
[9] Wiener, N. The ergodic theorem. Duke Math. J. 5(1939), 118.Google Scholar