A.V. Zvyagin, “Weak solvability and convergence of solutions for the fractional Voigt-α model of a viscoelastic medium”, Russian Math. Surveys, 74:3 (2019), 549-551.
A.V. Zvyagin, “Attractors for model of polymer solutions motion”, Discrete and Continuous Dynamical Systems, 28:12 (2018), 6305-6325.
A.V. Zvyagin, “Solvability for equations of motion of weak aqueous polymer solutions with objective derivative”, Nonlinear Analysis: Theory, Methods and Applications, 90 (2013), 70-85.
A.V. Zvyagin, “An optimal control problem with feedback for a mathematical model of the motion of weakly concentrated water polymer solutions with objective derivative”, Siberian Mathematical Journal, 54:4 (2013), 640-655.
A. V. Zvyagin, “Solvability for equations of motion of weak aqueous polymer solutions with objective derivative”, Nonlinear Analysis, Theory, Methods and Applications, 90 (2013), 70–85
V. G. Zvyagin, V. V. Obukhovskii, A. V. Zvyagin, “On inclusions with multivalued operators and their applications to some optimization problems”, Journal of Fixed Point Theory and Applications, 16:1-2 (2014), 27–82
A. V. Zvyagin, “Weak solvability and convergence of solutions for the fractional Voigt-$\alpha$ model of a viscoelastic medium”, Russian Math. Surveys, 74:3 (2019), 549–551
4.
A. V. Zvyagin, V. P. Orlov, “Solvability of the Thermoviscoelasticity Problem for Linearly Elastically Retarded Voigt Fluid”, Math. Notes, 97:5 (2015), 694–708
5.
A. V. Zvyagin, “An optimal control problem with feedback for a mathematical model of the motion of weakly concentrated water polymer solutions with objective derivative”, Siberian Math. J., 54:4 (2013), 640–655
6.
A. V. Zvyagin, “Optimal control problem for a stationary model of low concentrated aqueous polymer solutions”, Differential Equations, 49:2 (2013), 246–250
7.
A. V. Zvyagin, “Solvability of a stationary model of motion of weak aqueous polymer solutions”, Russian Math. (Iz. VUZ), 55:2 (2011), 90–92
8.
A. V. Zvyagin, “Investigation of the weak solubility of the fractional Voigt alpha-model”, Izv. Math., 85:1 (2021), 61–91
9.
A. V. Zvyagin, “Attractors for a model of polymer motion with objective derivative in the rheological relation”, Doklady Mathematics, 88:3 (2013), 730–733
10.
A. V. Zvyagin, V. P. Orlov, “Solvability of thermoviscoelastic problem for one Oskolkovs model”, Russian Math. (Iz. VUZ), 58:9 (2014), 57–61
11.
V. Zvyagin, A. Zvyagin, A. Ustiuzhaninova, “Optimal feedback control problem for the fractional Voigt-α model”, Mathematics, 8:7, Special Issue “Recent Investigations of Differential and Fractional Equations and Inclusions” (2020), 1197 , 27 pp.
A. V. Zvyagin, V. G. Zvyagin, D. M. Polyakov, “Dissipative solvability of an alpha model of fluid flow with memory”, Computational Mathematics and Mathematical Physics, 59:7 (2019), 1185–1198
16.
A. V. Zvyagin, “Attractors for model of polymer solutions motion”, Discrete and Continuous Dynamical Systems, 28:12 (2018), 6305–6325
A. V. Zvyagin, V. G. Zvyagin, D. M. Polyakov, “On solvability of one alpha-model of fluid motion with memory”, Russian Math. (Iz. VUZ), 62:6 (2018), 69–74
18.
V. G. Zvyagin, A. V. Zvyagin, “Optimal feedback control for a thermoviscoelastic model of the motion of water polymer solutions”, Siberian Adv. Math., 29:2 (2019), 137–152
19.
A. V. Zvyagin, “Study of solvability of a thermoviscoelastic model describing the motion of weakly concentrated water solutions of polymers”, Siberian Math. J., 59:5 (2018), 843–859
20.
V. G. Zvyagin, A. V. Zvyagin, M. V. Turbin, “Optimal Feedback Control Problem for the Bingham Model with Periodical Boundary Conditions on Spatial Variables”, Journal of Mathematical Sciences, 244 (2020), 959–980
21.
A. V. Zvyagin, “Solvability of thermoviscoelastic problem for Leray alpha-model”, Russian Math. (Iz. VUZ), 60:10 (2016), 59–63
22.
A. V. Zvyagin, “Optimal Feedback Control for Leray and Navier-Stokes Alpha Models”, Doklady Mathematics, 99:3 (2019), 299–302
23.
A. V. Zvyagin, “Optimal feedback control in the stationary mathematical model of low concentrated aqueous polymer solutions”, Applicable Analysis, 92:6 (2013), 1157–1168
A. V. Zvyagin, “Weak Solvability of the Nonlinearly Viscous Pavlovskii Model”, Russian Mathematics, 66:6 (2022), 73–78
25.
V. G. Zvyagin, A. V. Zvyagin, N. M. Hong, “Optimal Feedback Control for a Model of Motion of a Nonlinearly Viscous Fluid”, Differential Equations, 57:1 (2021), 122–126
26.
A. V. Zvyagin, “Navier-Stokes-Alpha Model with Temperature-Dependent Viscosity”, Doklady Mathematics, 101:2 (2020), 122–125
27.
A. V. Zvyagin, “Solvability of a Thermoviscoelastic Model of the Motion of Solutions of Polymers Satisfying the Objectivity Principle”, Math. Notes, 105:6 (2019), 831–845
28.
A. V. Zvyagin, “Weak Solvability of Kelvin–Voigt Model of Thermoviscoelasticity”, Russian Mathematics, 62:3 (2018), 79–83
29.
A. V. Zvyagin, “Uniform attractors for non-autonomous systems of nonlinearly viscous fluid”, Lobachevskii Journal of Mathematics, 44:3 (2023), 956–968
A. V. Zvyagin, E. I. Kostenko, “On the existence of feedback control for one fractional Voigt model”, Differential Equation, 59:12 (2023), 1778–1783
32.
A. V. Zvyagin, V. G. Zvyagin, “Pullback attractors for a model of weakly concentrated aqueous polymer solution motion with a rheological relation satisfying the objectivity principle”, Doklady Mathematics, 95:3 (2017), 247–249
33.
A. V. Zvyagin, “On the existence of weak solutions of the Kelvin–Voigt model”, Math. Notes, 116:1 (2024), 130–135
34.
V. G. Zvyagin, A. V. Zvyagin, V. P. Orlov, M. V. Turbin, “On the weak solvability of high-order viscoelastic fluid dynamics model”, Lobachevskii Journal of Mathematics, 45:4 (2024), 1524–1543
35.
V. Zvyagin, V. Orlov, A. Zvyagin, “On Some Properties of Trajectories of Non-Smooth Vector Fields”, Mathematics, 12:11 (2024), 1703 , 18 pp.
36.
A. V. Zvyagin, E. I. Kostenko, “Zadacha suschestvovaniya upravleniya s obratnoi svyazyu dlya odnoi drobnoi modeli Foigta”, Sovremennaya matematika. Fundamentalnye napravleniya, 69:4 (2023), 621–642
37.
A. Ashyralyev, V. Zvyagin, A. Zvyagin, “About optimal feedback control problem for motion model of nonlinearly viscous fluid”, AIP Conference Proceedings. ICAAM 2020, 2325 (2021), 020003 , 4 pp.
38.
A. V. Zvyagin, “An alpha-model of polymer solutions motion”, Russian Mathematics, 65:5 (2021), 21–29
39.
D. M. Polyakov, A. Zvyagin, “Dissipative solvability of Jeffreys-Oldroud-α model”, Topological Methods in Nonlinear Analysis, 57:2 (2021), 465–488
40.
A. V. Zvyagin, V. G. Zvyagin, “Weak solvability of termo-Voigt-α model”, Lobachevskii Journal of Mathematics, 42:15 (2021), 3793–3809
41.
V. G. Zvyagin, A. V. Zvyagin, N. M. Hong, “Optimal feedback control for one motion model of a nonlinearly viscous fluid”, Chebyshevskii Sbornik, 21:2 (2020), 144–158
42.
A. V. Zvyagin, “Solvability of one class of thermo-visco-elastic–models”, AIP Conference Proceedings. ICAAM 2018., 1997 (2018), 020078 , 5 pp.
43.
A. V. Zvyagin, D. M. Polyakov, “Issledovanie dissipativnoi razreshimosti alfa-modeli maksvella”, Tavricheskii vestnik informatiki i matematiki, 2018, no. 4, 67–89
44.
A. V. Zvyagin, “O razreshimosti alfa-modeli dvizheniya rastvorov polimerov”, Vestnik VGU. Seriya: Fizika, Matematika, 2018, no. 4, 113–115
45.
V. G. Zvyagin, A. V. Zvyagin, M. V. Turbin, “Ob odnom variante approksimatsionno-topologicheskogo metoda issledovaniya slaboi razreshimosti sistemy Nave-Stoksa”, Vestnik VGU. Seriya: Fizika. Matematika, 2017, no. 3, 104–124
46.
V. G. Zvyagin, A. V. Zvyagin, M. V. Turbin, “Variant approksimatsionno-topologicheskogo metoda issledovaniya slaboi razreshimosti sistemy Nave-Stoksa na osnove parabolicheskoi regulyarizatsii”, Vestnik VGU. Seriya: Fizika. Matematika, 2017, no. 3, 125–142
47.
V. G. Zvyagin, A. V. Zvyagin, “Pullback attractors for a model of polymer solutions motion with rheological relation satisfying the objectivity principle”, Journal of Mathematical Sciences, 248 (2020), 600–620
48.
A. V. Zvyagin, V. G. Zvyagin, D. M. Polyakov, “Razreshimost alfa-modelei gidrodinamiki”, Vestnik VGU. Seriya: Fizika. Matematika, 2 (2016), 72–93
49.
D. M. Polyakov, A. V. Zvyagin, “On dissipative solutions of the Jeffreys-Oldroyt-alpha equation”, Advancements in Mathematical Sciences, 1676 (2015), 020089 , 7 pp.
50.
A. V. Zvyagin, “Solvability of the stationary mathematical model of a non-newtonian fluid motion with objective derivative”, Fixed Point Theory, 15:2 (2014), 623–634
51.
A. V. Zvyagin, “Optimalnoe upravlenie s obratnoi svyazyu dlya odnoi statsionarnoi modeli dvizheniya zhidkosti s ob'ektivnoi proizvodnoi”, Spektralnye i evolyutsionnye zadachi, 23 (2013), 91–102
52.
A. V. Zvyagin, “Issledovanie razreshimosti odnoi statsionarnoi modeli dvizheniya nenyutonovoi zhidkosti v neogranichennoi oblasti”, Vestnik VGU. Seriya: Fizika, Matematika, 2012, no. 2, 118–121
53.
A. V. Zvyagin, “Issledovanie razreshimosti statsionarnoi modeli dvizheniya slabykh vodnykh rastvorov polimerov”, Vestnik VGU. Seriya: Fizika. Matematika, 2011, no. 1, 147–156
54.
A. V. Zvyagin, “O korrektnoi razreshimosti nelineinyi uravnenii”, Spektralnye i evolyutsionnye zadachi, 20 (2010), 136–140
55.
A. V. Zvyagin, “Ob aksiomaticheskom podkhode k issledovaniyu svyaznosti mnozhestva reshenii operatornykh uravnenii”, Seminar po globalnomu i stokhasticheskomu analizu. Voronezhskii universitet, 2008, no. 3, 31–36
56.
A. V. Zvyagin, V. G. Zvyagin, V. P. Orlov, “Some properties of trajectories of a nonhomogeneous velocity field of a viscoelastic fluid in a multiconnected domain”, Math. Notes, 116:4 (2024), 853–857
57.
A. V. Borovskikh, V. G. Zadorozhnii, A. V. Zvyagin, V. G. Zvyagin, V. G. Kurbatov, V. V. Obukhovskii, “K devyanostoletiyu Anatoliya Ivanovicha Perova”, Differentsialnye uravneniya, 60:1 (2024), 143-144