Persons
RUS  ENG    JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB  
 
Milovanova, Tat'yana Aleksandrovna
Statistics Math-Net.Ru
Total publications: 9
Scientific articles: 9

Number of views:
This page:348
Abstract pages:2353
Full texts:1038
References:293
E-mail:

https://www.mathnet.ru/eng/person60123
List of publications on Google Scholar
https://zbmath.org/authors/?q=ai:milovanova.t-a

Publications in Math-Net.Ru Citations
2021
1. T. A. Milovanova, I. S. Zaryadov, L. A. Meykhanadzhyan, “Joint stationary distribution in the ${\mathrm{GI}/M/n/\infty}$ queue with general renovation”, Sistemy i Sredstva Inform., 31:3 (2021),  4–17  mathnet
2020
2. T. A. Milovanova, R. V. Razumchik, “A single-server queueing system with LIFO service, probabilistic priority, batch Poisson arrivals, and background customers”, Inform. Primen., 14:3 (2020),  26–34  mathnet 1
3. L. A. Meykhanadzhyan, I. S. Zaryadov, T. A. Milovanova, “Stationary characteristics of the two-node Markovian tandem queueing system with general renovation”, Sistemy i Sredstva Inform., 30:3 (2020),  14–31  mathnet
2019
4. I. S. Zaryadov, L. A. Meykhanadzhyan, T. A. Milovanova, “Stationary characteristics of the $\mathrm{GI}/\mathrm{MSP}/n/\infty$ queue with general renovation”, Sistemy i Sredstva Inform., 29:4 (2019),  50–64  mathnet 1
2015
5. L. A. Meykhanadzhyan, T. A. Milovanova, R. V. Razumchik, “Stationary waiting time in a queueing system with inverse service order and generalized probabilistic priority”, Inform. Primen., 9:2 (2015),  14–22  mathnet  elib 2
6. I. S. Zaryadov, L. A. Meykhanadzhyan, T. A. Milovanova, R. V. Razumchik, “On the method of calculating the stationary distribution in the finite two-channel system with ordered input”, Sistemy i Sredstva Inform., 25:3 (2015),  44–59  mathnet  elib 1
2014
7. L. A. Meykhanadzhyan, T. A. Milovanova, A. V. Pechinkin, R. V. Razumchik, “Stationary distribution in a queueing system with inverse service order and generalized probabilistic priority”, Inform. Primen., 8:3 (2014),  28–38  mathnet  elib 7
2013
8. T. A. Milovanova, A. V. Pechinkin, “Stationary characteristics of the queueing system with LIFO service, probabilistic priority, and hysteric policy”, Inform. Primen., 7:1 (2013),  22–35  mathnet 5
2009
9. T. A. Milovanova, “$\mathrm{BMAP}/\mathrm G/1/\infty$ system with last come first served probabilistic priority”, Avtomat. i Telemekh., 2009, no. 5,  155–168  mathnet  mathscinet  zmath; Autom. Remote Control, 70:5 (2009), 885–896  isi  scopus 7

Organisations
 
  Contact us:
  Terms of Use  Registration to the website  Logotypes © Steklov Mathematical Institute RAS, 2024