V.Zh. Sakbaev, D.V. Zavadsky

Moscow Institute of Physics and Technology, Dolgoprudny, 141701 Russia

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Abstract

Averaging of random shift operators on a space of the square integrable by shift-invariant measure complex-valued functions on linear topological spaces has been studied. The case of the l space has been considered as an example.

A shift-invariant measure on the l space, which was constructed by Caratheodory's scheme, is σ-additive, but not σ-finite. Furthermore, various approximations of measurable sets have been investigated. One-parameter groups of shifts along constant vector fields in the l space and semigroups of shifts to a random vector, the distribution of which is given by a collection of the Gaussian measures, have been discussed. A criterion of strong continuity for a semigroup of shifts along a constant vector field has been established.

Conditions for collection of the Gaussian measures, which guarantee the semigroup property and strong continuity of averaged one-parameter collection of linear operators, have been defined.

Keywords: strongly continuous semigroups, averaging of operator semigroups, shift-invariant measures, square integrable functions

Acknowledgements. The work was performed according to the Russian Government Program of Competitive Growth of Moscow Institute of Physics and Technology (project 5-100).

References

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4. Sakbaev V.Z. Random walks and measures on Hilbert space that are invariant with respect to shifts and rotations. Itogi Nauki Tekh., Ser.: Sovrem. Mat. Prilozh. Temat. Obz., 2017, vol. 140, pp. 88–118. (In Russian)

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Recieved

October 17, 2017

 

For citation: Sakbaev V.Zh., Zavadsky D.V. Shift-invariant measures on infinite-dimensional spaces: Integrable functions and random walks. Uchenye Zapiski Kazanskogo Universiteta. Seriya Fiziko-Matematicheskie Nauki, 2018, vol. 160, no. 2, pp. 384–391.

 

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