A.S. Ustiuzhaninova, “Uniform Attractors for the Modified Kelvin-Voigt Model”, Differential Equations, 57:9 (2021), 1165-1176
M. Turbin, A. Ustiuzhaninova, “Pullback attractors for weak solution to modified Kelvin-Voigt model”, Evolution Equations And Control Theory, 11:6 (2022), 2055-2072
M. Turbin, A. Ustiuzhaninova, “Trajectory and Global Attractors for the Kelvin-Voigt Model Taking into Account Memory along Fluid Trajectories”, Mathematics, 12:2 (2024), Article number 266
A. S. Ustiuzhaninova, “Uniform attractors for the Bingham model”, Izv. Vyssh. Uchebn. Zaved. Mat., 2024, no. 8, 65–80
2.
M. Turbin, A. Ustiuzhaninova, “Trajectory and Global Attractors for the Kelvin-Voigt Model Taking into Account Memory along Fluid Trajectories”, Mathematics, 12:2 (2024), 266 , 26 pp.
3.
M. V. Turbin, A. S. Ustiuzhaninova, “Solvability of an Initial–Boundary Value Problem for the Modified Kelvin–Voigt Model with Memory along Fluid Motion Trajectories”, Differential Equations, 60 (2024), 180-203
2023
4.
M. Turbin, A. Ustiuzhaninova, “Existence of weak solution to initial-boundary value problem for finite order Kelvin-Voigt fluid motion model”, Boletín de la Sociedad Matemática Mexicana, 29 (2023), 54 , 37 pp.
V. G. Zvyagin, A. S. Ustiuzhaninova, “Pullback Attractors of the Bingham Model”, Differential Equations, 59 (2023), 377-382
2022
6.
M. V. Turbin, A. S. Ustiuzhaninova, “Convergence of attractors for an approximation to attractors of a modified Kelvin–Voigt model”, Comput. Math. Math. Phys., 62:2 (2022), 325–335
7.
A. Ustiuzhaninova, M. Turbin, “Feedback control problem for modified Kelvin-Voigt model”, Journal of Dynamical and Control Systems, 28:3 (2022), 465–480
M. Turbin, A. Ustiuzhaninova, “Pullback attractors for weak solution to modified Kelvin-Voigt model”, Evolution Equations And Control Theory, 11:6 (2022), 2055–2072
A. S. Ustiuzhaninova, “Pullback-attractors for the modified Kelvin-Voigt model”, Russian Math. (Iz. VUZ), 65:5 (2021), 77–82
10.
A. S. Ustiuzhaninova, M. V. Turbin, “Trajectory and global attractors for a modified Kelvin—Voigt model”, J. Appl. Industr. Math., 15:1 (2021), 158–168
11.
A. S. Ustiuzhaninova, “Uniform Attractors for the Modified Kelvin-Voigt Model”, Differential Equations, 57:9 (2021), 1165–1176
2020
12.
V. Zvyagin, A. Zvyagin, A. Ustiuzhaninova, “Optimal feedback control problem for the fractional Voigt-$\alpha$ model”, Mathematics, 8:7 (2020), 1197 , 27 pp.
M. V. Turbin, A. S. Ustiuzhaninova, “The existence theorem for a weak solution to initial-boundary value problem for system of equations describing the motion of weak aqueous polymer solutions”, Russian Math. (Iz. VUZ), 63:8 (2019), 54–69
14.
P. I. Plotnikov, M. V. Turbin, A. S. Ustiuzhaninova, “Existence Theorem for a Weak Solution of the Optimal Feedback Control Problem for the Modified Kelvin-Voigt Model of Weakly Concentrated Aqueous Polymer Solutions”, Doklady Mathematics, 100:2 (2019), 433–435