# zbMATH — the first resource for mathematics

## Semenova, Olga V.

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 Author ID: semenova.olga-v Published as: Semenova, O. V.; Semenova, Olga; Semenova, Olga V.; Semenova, O.
 Documents Indexed: 14 Publications since 1999
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#### Co-Authors

 4 single-authored 3 Dudin, Alexander N. 3 Vishnevskij, V. M. 2 Shpilev, S. A. 1 Bui, Duy T. 1 Ivanov, Roman V. 1 Lakontsev, D. V. 1 Larionov, Andrey 1 Lykov, Stanislav 1 Sharov, S. Yu. 1 Vishnevsky, Vladimir M.

#### Serials

 8 Automation and Remote Control 1 Journal of Applied Probability 1 Journal of Mathematical Sciences (New York) 1 International Journal of Applied Mathematical Analysis and Applications

#### Fields

 10 Operations research, mathematical programming (90-XX) 6 Probability theory and stochastic processes (60-XX) 1 Functions of a complex variable (30-XX) 1 Game theory, economics, finance, and other social and behavioral sciences (91-XX) 1 Information and communication theory, circuits (94-XX)

#### Citations contained in zbMATH Open

10 Publications have been cited 81 times in 13 Documents Cited by Year
Mathematical methods to study the polling systems. Zbl 1126.60321
Vishnevskii, V. M.; Semenova, O. V.
2006
A stable algorithm for stationary distribution calculation for a BMAP/SM/1 queueing system with Markovian arrival input of disasters. Zbl 1057.60084
Dudin, Alexander; Semenova, Olga
2004
An optimal multithreshold control for the input flow of the $$GI/PH/1$$ queueing system with a BMAP flow of negative customers. Zbl 1094.90008
Dudin, A. N.; Kim, C. S.; Semenova, O. V.
2004
Modeling and analysis of a hybrid communication channel based on free-space optical and radio-frequency technologies. Zbl 1282.94024
Vishnevskii, V. M.; Semenova, O. V.; Sharov, S. Yu.
2013
An optimal threshold control for a $$BMAP/SM/1$$ system with map disaster flow. Zbl 1081.90021
Semenova, O. V.
2003
Multithreshold control of the $$BMAP/G/1$$ queuing system with map flow of Markovian disasters. Zbl 1195.90032
Semenova, O. V.
2007
A queueing system with two operation modes and a disaster flow: its stationary state probability distribution. Zbl 1066.90518
Semenova, O. V.
2002
Optimal multi-threshold control for a $$BMAP/SM/1$$ retrial queue with disasters. Zbl 1266.90087
Semenova, Olga V.; Dudin, Alexander N.
2008
On the porosity of the limit set and the boundedness of oscillation for the function $$\log(\text{dist}(x,\lambda))$$ in the case of a Fuchsian group without parabolic elements. Zbl 0999.30027
Semenova, O.
1999
A model of the polling system for studying the broadband wireless networks. Zbl 1194.90023
Vishnevskii, V. M.; Lakontsev, D. V.; Semenova, O. V.; Shpilev, S. A.
2006
Modeling and analysis of a hybrid communication channel based on free-space optical and radio-frequency technologies. Zbl 1282.94024
Vishnevskii, V. M.; Semenova, O. V.; Sharov, S. Yu.
2013
Optimal multi-threshold control for a $$BMAP/SM/1$$ retrial queue with disasters. Zbl 1266.90087
Semenova, Olga V.; Dudin, Alexander N.
2008
Multithreshold control of the $$BMAP/G/1$$ queuing system with map flow of Markovian disasters. Zbl 1195.90032
Semenova, O. V.
2007
Mathematical methods to study the polling systems. Zbl 1126.60321
Vishnevskii, V. M.; Semenova, O. V.
2006
A model of the polling system for studying the broadband wireless networks. Zbl 1194.90023
Vishnevskii, V. M.; Lakontsev, D. V.; Semenova, O. V.; Shpilev, S. A.
2006
A stable algorithm for stationary distribution calculation for a BMAP/SM/1 queueing system with Markovian arrival input of disasters. Zbl 1057.60084
Dudin, Alexander; Semenova, Olga
2004
An optimal multithreshold control for the input flow of the $$GI/PH/1$$ queueing system with a BMAP flow of negative customers. Zbl 1094.90008
Dudin, A. N.; Kim, C. S.; Semenova, O. V.
2004
An optimal threshold control for a $$BMAP/SM/1$$ system with map disaster flow. Zbl 1081.90021
Semenova, O. V.
2003
A queueing system with two operation modes and a disaster flow: its stationary state probability distribution. Zbl 1066.90518
Semenova, O. V.
2002
On the porosity of the limit set and the boundedness of oscillation for the function $$\log(\text{dist}(x,\lambda))$$ in the case of a Fuchsian group without parabolic elements. Zbl 0999.30027
Semenova, O.
1999
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#### Cited by 22 Authors

 3 Dudin, Alexander N. 2 Chakravarthy, Srinivas R. 2 Vishnevsky, Vladimir M. 1 Altay, Nezih 1 Deepak, T. G. 1 Green, Walter G. III 1 Inoue, Yoshiaki 1 Joshua, Varghese C. 1 Kashtanov, Victor A. 1 Kim, Chesoong 1 Klimenok, Valentina Ivanovna 1 Kodrashova, E. V. 1 Korotysheva, Anna 1 Krishnamoorthy, Achyutha 1 Liu, Zaiming 1 Moltchanov, Dmitri 1 Starovoitov, A. N. 1 Takine, Tetsuya 1 Wu, Jinbiao 1 Yang, Gang 1 Zaryadov, I. S. 1 Zeifman, Alexander Izrailevich
all top 5

#### Cited in 10 Serials

 2 Applied Mathematical Modelling 2 Automation and Remote Control 1 Problems of Information Transmission 1 Applied Mathematics and Computation 1 Journal of Applied Probability 1 Optimization 1 European Journal of Operational Research 1 Stochastic Models 1 Journal of Industrial and Management Optimization 1 Computer Science Review

#### Cited in 4 Fields

 10 Operations research, mathematical programming (90-XX) 8 Probability theory and stochastic processes (60-XX) 1 Computer science (68-XX) 1 Systems theory; control (93-XX)