Geodesic
Точный бэровский класс асимптотической топологической энтропии семейства неавтономных динамических систем
Trudy Seminara im. I.G. Petrovskogo, Trudy Seminara imeni I. G. Petrovskogo, Tome 33 (2023) no. 33, pp. 41-53 
A. N. Vetokhin. Точный бэровский класс асимптотической топологической энтропии семейства неавтономных динамических систем. Trudy Seminara im. I.G. Petrovskogo, Trudy Seminara imeni I. G. Petrovskogo, Tome 33 (2023) no. 33, pp. 41-53. http://geodesic.mathdoc.fr/item/TSP_2023_33_33_a3/
@article{TSP_2023_33_33_a3,
     author = {A. N. Vetokhin},
     title = {{\CYRT}{\cyro}{\cyrch}{\cyrn}{\cyrery}{\cyrishrt} {\cyrb}{\cyrerev}{\cyrr}{\cyro}{\cyrv}{\cyrs}{\cyrk}{\cyri}{\cyrishrt} {\cyrk}{\cyrl}{\cyra}{\cyrs}{\cyrs} {\cyra}{\cyrs}{\cyri}{\cyrm}{\cyrp}{\cyrt}{\cyro}{\cyrt}{\cyri}{\cyrch}{\cyre}{\cyrs}{\cyrk}{\cyro}{\cyrishrt} {\cyrt}{\cyro}{\cyrp}{\cyro}{\cyrl}{\cyro}{\cyrg}{\cyri}{\cyrch}{\cyre}{\cyrs}{\cyrk}{\cyro}{\cyrishrt} {\cyrerev}{\cyrn}{\cyrt}{\cyrr}{\cyro}{\cyrp}{\cyri}{\cyri} {\cyrs}{\cyre}{\cyrm}{\cyre}{\cyrishrt}{\cyrs}{\cyrt}{\cyrv}{\cyra} {\cyrn}{\cyre}{\cyra}{\cyrv}{\cyrt}{\cyro}{\cyrn}{\cyro}{\cyrm}{\cyrn}{\cyrery}{\cyrh} {\cyrd}{\cyri}{\cyrn}{\cyra}{\cyrm}{\cyri}{\cyrch}{\cyre}{\cyrs}{\cyrk}{\cyri}{\cyrh} {\cyrs}{\cyri}{\cyrs}{\cyrt}{\cyre}{\cyrm}},
     journal = {Trudy Seminara im. I.G. Petrovskogo},
     pages = {41--53},
     year = {2023},
     volume = {33},
     number = {33},
     language = {ru},
     url = {http://geodesic.mathdoc.fr/item/TSP_2023_33_33_a3/}
}
TY  - JOUR
AU  - A. N. Vetokhin
TI  - Точный бэровский класс асимптотической топологической энтропии семейства неавтономных динамических систем
JO  - Trudy Seminara im. I.G. Petrovskogo
PY  - 2023
SP  - 41
EP  - 53
VL  - 33
IS  - 33
UR  - http://geodesic.mathdoc.fr/item/TSP_2023_33_33_a3/
LA  - ru
ID  - TSP_2023_33_33_a3
ER  - 
%0 Journal Article
%A A. N. Vetokhin
%T Точный бэровский класс асимптотической топологической энтропии семейства неавтономных динамических систем
%J Trudy Seminara im. I.G. Petrovskogo
%D 2023
%P 41-53
%V 33
%N 33
%U http://geodesic.mathdoc.fr/item/TSP_2023_33_33_a3/
%G ru
%F TSP_2023_33_33_a3

Voir la notice du chapitre de livre provenant de la source Math-Net.Ru

[1] Kolyada S., Snoha L., “Topological entropy of nonautonomous dynamical systems”, Random Comput. Dynamics, 4:2 (1996), 205–233 | MR | Zbl

[2] Adler R. L., Konheim A. G., McAndrew M.H., “Topological entropy”, Trans. Amer. Math. Soc., 114:2 (1965), 309–319 | DOI | MR | Zbl

[3] Misiurewicz M. T., “Horseshoes for mappings of the interval”, Bull. Acad. Polon. Sci., Ser. Math. Astron. Phys., 27 (1979), 167–169 | MR | Zbl

[4] Vetokhin A. N., “O nekotorykh svoistvakh topologicheskoi entropii dinamicheskikh sistem”, Matem. zametki, 93:3 (2013), 347–356 | DOI | MR | Zbl

[5] Ber R., Teoriya razryvnykh funktsii, M.–L, 1932

[6] Vetokhin A. N., “Tipichnoe svoistvo topologicheskoi entropii nepreryvnykh otobrazhenii kompaktov”, Differents. uravn., 53:4 (2017), 448–453 | DOI | MR | Zbl

[7] Vetokhin A. N., “Neprinadlezhnost pervomu klassu Bera topologicheskoi entropii na prostranstve gomeomorfizmov”, Vestn. Mosk. un-ta. Ser. 1. Matem., mekh., 2016, no. 2, 44–48 | MR | Zbl

[8] Vetokhin A. N., “Tochnyi berovskii klass topologicheskoi entropii neavtonomnykh dinamicheskikh sistem”, Matem. zametki, 106:3 (2019), 341–348 | DOI | MR

[9] Vetokhin A. N., “O neprinadlezhnosti vtoromu berovskomu klassu topologicheskoi entropii odnogo semeistva gladkikh neavtonomnykh dinamicheskikh sistem na otrezke, nepreryvno zavisyaschikh ot parametra”, Differents. uravn., 56:1 (2020), 133–136 | DOI | Zbl

[10] Khausdorf F., Teoriya mnozhestv, ONTI, M., 1937

[11] Vetokhin A. N., “Klass Bera maksimalnykh polunepreryvnykh snizu minorant pokazatelei Lyapunova”, Differents. uravn., 34:10 (1998), 1313–1317 | MR | Zbl