4.Z.S. Aliyev, “Basis properties of a fourth order differential operator with spectral parameter in the boundary condition”, Cent. Euro. J. Math., 8:2 (2010), 378-388.
5.Z.S. Aliev, “Bazisnye svoistva v prostranstve L(p) sistem kornevykh funktsii odnoi spektralnoi zadachi so spektralnym parametrom v granichnom uslovii”, Differents. uravneniya, 46:6 (2011), 764-775.
V. N. Zverev, N. A. Abdullaev, Z. S. Aliyev, I. R. Amireslanov, M. M. Otrokov, N. T. Mamedov, E. V. Chulkov, “Transport properties of the magnetic topological insulators family (MnBi$_2$Te$_4$)(Bi$_2$Te$_3)_m$$(m = 0,1,...,6)$”, Pis'ma v Zh. Èksper. Teoret. Fiz., 118:12 (2023), 902–907; JETP Letters, 118:12 (2023), 905–910
2.
A. A. Maksimov, I. I. Tartakovskii, Z. S. Aliev, I. R. Amireslanov, N. A. Abdullaev, V. N. Zverev, Z. A. Jahangirli, I. Yu. Sklyadneva, M. M. Otrokov, N. T. Mamedov, E. V. Chulkov, “Temperature studies of raman spectra in MnBi$_2$Te$_4$ and MnSb$_2$Te$_4$ magnetic topological insulators”, Pis'ma v Zh. Èksper. Teoret. Fiz., 118:5 (2023), 361–366; JETP Letters, 118:5 (2023), 357–362
2022
3.
N. A. Abdullaev, I. R. Amireslanov, Z. S. Aliyev, Z. A. Jahangirli, I. Yu. Sklyadneva, E. G. Alizade, E. N. Aliyeva, M. M. Otrokov, V. N. Zverev, N. T. Mamedov, E. V. Chulkov, “Lattice dynamics of Bi$_2$Te$_3$ and vibrational modes in Raman scattering of topological insulators MnBi$_2$Te$_4\cdot n$(Bi$_2$Te$_3$)”, Pis'ma v Zh. Èksper. Teoret. Fiz., 115:12 (2022), 801–808; JETP Letters, 115:12 (2022), 749–756
N. A. Abdullaev, Kh. V. Aliguliyeva, V. N. Zverev, Z. S. Aliyev, I. R. Amireslanov, M. B. Babanly, Z. A. Jahangirli, E. N. Aliyeva, Kh. N. Akhmedova, T. G. Mamedov, M. M. Otrokov, A. M. Shikin, N. T. Mamedov, E. V. Chulkov, “The charge transport mechanism in a new magnetic topological insulator MnBi$_{0.5}$Sb$_{1.5}$Te$_{4}$”, Fizika Tverdogo Tela, 63:8 (2021), 1062–1067; Phys. Solid State, 63:7 (2021), 1120–1125
Z. S. Aliyev, A. G. Geidarov, “Spectral Properties of the Sturm–Liouville Operator with $\delta$-Potential and with Spectral Parameter in the Boundary Condition”, Mat. Zametki, 101:5 (2017), 792–797; Math. Notes, 101:5 (2017), 913–918
2016
6.
Z. S. Aliyev, “Global bifurcation of solutions of certain nonlinear eigenvalue problems for ordinary differential equations of fourth order”, Mat. Sb., 207:12 (2016), 3–29; Sb. Math., 207:12 (2016), 1625–1649
Ziyatkhan S. Aliyev, F.-kh. I. Allahverdi-zada, “Some spectral properties of the boundary value problem with spectral parameter in the boundary conditions”
8.
Ziyatkhan S. Aliyev, Sevinc B. Guliyeva, “Spectral properties for the equation of vibrating beam”
2014
9.
Ziyatkhan S. Aliyev, Elmin A. Agayev, “Structure of the root subspaces and oscillation properties of the eigenfunctions of completely regular Sturmian systems”
2006
10.
N. B. Kerimov, Z. S. Aliyev, “Basis properties of a spectral
problem with spectral parameter in the boundary condition”, Mat. Sb., 197:10 (2006), 65–86; Sb. Math., 197:10 (2006), 1467–1487
A. P. Makhmudov, Z. S. Aliev, “Some global results for fourth-order nonlinear spectral Sturm–Liouville problems”, Differ. Uravn., 29:8 (1993), 1330–1339; Differ. Equ., 29:8 (1993), 1152–1160
1990
12.
A. P. Makhmudov, Z. S. Aliyev, “Nondifferentiable perturbations of spectral problems for a pair of selfadjoint operators and global bifurcation”, Izv. Vyssh. Uchebn. Zaved. Mat., 1990, no. 1, 44–52; Soviet Math. (Iz. VUZ), 34:1 (1990), 51–60
A. P. Makhmudov, Z. S. Aliyev, “Some global results for linearizable and nonlinearizable fourth-order Sturm–Liouville problems”, Dokl. Akad. Nauk SSSR, 309:1 (1989), 34–38; Dokl. Math., 40:3 (1990), 472–476
14.
A. P. Makhmudov, Z. S. Aliyev, “Global bifurcation of solutions of some nonlinearizable eigenvalue
problems”, Dokl. Akad. Nauk SSSR, 308:4 (1989), 783–787; Dokl. Math., 40:2 (1990), 367–371
15.
A. P. Makhmudov, Z. S. Aliyev, “Global bifurcation of solutions of some nonlinearizable eigenvalue problems”, Differ. Uravn., 25:1 (1989), 89–96; Differ. Equ., 25:1 (1989), 71–76
A. P. Makhmudov, Z. S. Aliyev, “Nondifferentiable perturbations of spectral problems for a pair of
selfadjoint operators, and global bifurcation”, Dokl. Akad. Nauk SSSR, 301:3 (1988), 551–554; Dokl. Math., 38:1 (1989), 122–126
1987
17.
A. P. Makhmudov, Z. S. Aliyev, “On a nonlinear analogue of the implicit method in the theory of
perturbations of an isolated eigenvalue”, Dokl. Akad. Nauk SSSR, 295:6 (1987), 1306–1309; Dokl. Math., 36:1 (1988), 189–192