Moiseeva Svetlana Petrovna

Publications in Math-Net.Ru

1. Application of negative binomial distribution to approximate the stationary distribution of the number of arrivals in a QS with an incoming MAP, the intensity of which depends on the state of the system
   
   UBS, 108 (2024),  40–56
2. About the history of the scientific school of Applied Probabilistic analysis and Queuing theory of the PT&MS Department of Tomsk State University
   
   Chebyshevskii Sb., 24:4 (2023),  372–379
3. Asymptotic analysis of resource heterogeneous QS $(\text{MMPP}+2\text{M})^{(2,\nu)}/\text{GI}(2)/\infty$ under equivalently increasing service time
   
   Avtomat. i Telemekh., 2022, no. 8,  81–99
4. Scalar-vector recurrent algorithm for stationary probabilities in a heterogeneous system $\mathrm{M}/(\mathrm{M}_1, \mathrm{M}_2)/(\mathrm{N}_1,\mathrm{N}_2)/\infty/\mathrm{FIFO}$
   
   UBS, 98 (2022),  5–21
5. Heterogeneous queueing system $\mathrm{MR(S)/M(S)/}\infty$ with service parameters depending on the state of the underlying Markov chain
   
   Izv. Saratov Univ. Math. Mech. Inform., 20:3 (2020),  388–399
6. Asymptotic analysis of retrial queueing system $M/M/1$ with impatient customers, collisions and unreliable server
   
   J. Sib. Fed. Univ. Math. Phys., 13:2 (2020),  218–230
7. Heterogeneous system MMPP/GI(2)/$\infty$ with random customers capacities
   
   J. Sib. Fed. Univ. Math. Phys., 12:2 (2019),  231–239
8. Asymptotic analysis of an retrial queueing system $\mathrm{M}|\mathrm{M}|1$ with collisions and impatient calls
   
   Avtomat. i Telemekh., 2018, no. 12,  44–56
9. Study of the $\mathrm{MMPP/GI/}\infty$ queueing system with random customers' capacities
   
   Inform. Primen., 11:4 (2017),  109–117