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Uniform Convergence on Subspaces in the von Neumann Ergodic Theorem with Discrete Time. / Kachurovskii, A. G.; Podvigin, I. V.; Khakimbaev, A. Zh.
в: Mathematical Notes, Том 113, № 5-6, 06.2023, стр. 680-693.Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование
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TY - JOUR
T1 - Uniform Convergence on Subspaces in the von Neumann Ergodic Theorem with Discrete Time
AU - Kachurovskii, A. G.
AU - Podvigin, I. V.
AU - Khakimbaev, A. Zh
N1 - This work was carried out in the framework of the state assignment at Institute of Mathematics, Siberian Branch of Russian Academy of Sciences (grant no. FWNF-2022-0004).
PY - 2023/6
Y1 - 2023/6
N2 - We consider the power-law uniform (in the operator norm) convergence on vector subspaces with their own norms in the von Neumann ergodic theorem with discrete time. All possible exponents of the considered power-law convergence are found; for each of these exponents, spectral criteria for such convergence are given and the complete description of all such subspaces is obtained. Uniform convergence on the whole space takes place only in the trivial cases, which explains the interest in uniform convergence precisely on subspaces. In addition, by the way, old estimates of the rates of convergence in the von Neumann ergodic theorem for measure-preserving mappings are generalized and refined.
AB - We consider the power-law uniform (in the operator norm) convergence on vector subspaces with their own norms in the von Neumann ergodic theorem with discrete time. All possible exponents of the considered power-law convergence are found; for each of these exponents, spectral criteria for such convergence are given and the complete description of all such subspaces is obtained. Uniform convergence on the whole space takes place only in the trivial cases, which explains the interest in uniform convergence precisely on subspaces. In addition, by the way, old estimates of the rates of convergence in the von Neumann ergodic theorem for measure-preserving mappings are generalized and refined.
KW - power-law uniform convergence
KW - rate of convergence in ergodic theorems
KW - von Neumann ergodic theorem
UR - https://www.scopus.com/record/display.uri?eid=2-s2.0-85163150206&origin=inward&txGid=298b3045692dfa144ff6c26330c17330
UR - https://www.mendeley.com/catalogue/6ab72504-25ca-3bd8-8281-8f85193797de/
U2 - 10.1134/S0001434623050073
DO - 10.1134/S0001434623050073
M3 - Article
VL - 113
SP - 680
EP - 693
JO - Mathematical Notes
JF - Mathematical Notes
SN - 0001-4346
IS - 5-6
ER -
ID: 55562306