N. N. Petrov, A. Ya. Narmanov, “Multiple capture of a given number of evaders in the problem of a simple pursuit”, Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 28:2 (2018), 193–198
2.
A. Azamov, A. Ya. Narmanov, “On the Limit Sets of Orbits of Systems of Vector Fields”, Differ. Equ., 40:2 (2004), 271–275
3.
Narmanov, A. Ya.; Saitova, S. S, “On the geometry of orbits of Killing vector fields.”, Differential Equations, 50:12, Translation of Differ. Uravn. 50 (2014), no. 12, 1582–1589. Differ. Equ. 50 (2014), no. 12, 1584–1591. (2014), MR3369197 , 1584-1591 pp.
4.
A. Ya. Narmanov, “Stability of completely controllable systems”, Differ. Equ., 36:10 (2000), 1475–1483
5.
N. N. Petrov, A. Ya. Narmanov., “Multiple Capture of a Given Number of Evaders in a Problem with Fractional Derivatives and a Simple Matrix.”, Proceedings of the Steklov Institute of Mathematics, 309 (2020), 105-115
Narmanov, A. Ya.; Saitova, S. S, “On the geometry of the reachability set of vector fields”, Differential Equations, 53:3 (2017) , 6 pp. https://link.springer.com/article/10.1134/S001226611703003X
7.
A. Ya. Narmanov, “On the transversal structure of the controllability sets of symmetric control systems”, Differ. Equ., 32:6 (1996), 786–789
8.
Abdigappar Narmanov and Eldor Rajabov, “On the Geometry of Orbits of Conformal Vector Fields”, Journal of Geometry and Symmetry in Physics, 51 (2019), 29-39 https://projecteuclid.org/euclid.jgsp/1556244027
A. Ya. Narmanov, “On the dependence of the controllability set on the target point”, Differ. Equ., 31:4 (1995), 555–558
10.
A. Ya. Narmanov, A. N. Zoyidov, “On the group of diffeomorphisms of foliated manifolds”, Vestn. Udmurtsk. un-ta. Matem. Mekh. Kompyut. nauki, 30:1 (2020), 49–58;
A. Ya. Narmanov, A. S. Sharipov, “On the diffeomorphism groups of foliated manifolds”, Proceedings of the International Conference “Classical and Modern Geometry”
Dedicated to the 100th Anniversary of the Birth of Professor Vyacheslav Timofeevich Bazylev.
Moscow, April 22-25, 2019. Part 3, Itogi Nauki i Tekhniki. Ser. Sovrem. Mat. Pril. Temat. Obz., 181, VINITI, Moscow, 2020, 74–83
12.
N. N. Petrov, A. Ya. Narmanov, “Multiple capture of a given number of evaders in a problem with fractional derivatives and a simple matrix”, Proc. Steklov Inst. Math. (Suppl.), 309, suppl. 1 (2020), S105–S115
13.
A. Ya. Narmanov, K. A. Shchelchkov, “The evasion problem in a nonlinear differential game with discrete control”, Izv. IMI UdGU, 52 (2018), 75–85
14.
A. Ya. Narmanov, “On Stability of Totally Controlled Systems”, Siberian Adv. Math., 11:4 (2001), 110–125
15.
A. Ya. Narmanov, “On the dependence of the controllability set on the target point”, Differ. Equ., 33:10 (1997), 1341–1345
16.
A. Ya. Narmanov, Differ. Uravn., 19:9 (1983), 1627–1630
17.
A. Ya. Narmanov, S. S. Saitova, “On the Geometry of Vector Fields”, Journal of Mathematical Sciences, 245:3 (2020), 375–381
18.
A. Ya. Narmanov, “On the geometry of totally geodesic Riemannian foliations”, Russian Math. (Iz. VUZ), 43:9 (1999), 23–28
19.
A. Ya. Narmanov, “On the Geometry of Totally Geodesic Riemannian Foliations”, Siberian Adv. Math., 10:2 (2000), 104–111
20.
A. Ya. Narmanov, N. N. Petrov, Differ. Uravn., 21:4 (1985), 605–614
21.
A. Ya. Narmanov, “DEPENDENCE OF THE CONTROLLABILITY SET ON THE TARGET POINT”, Differential equations., 21:9 (1985), 1504–1508
22.
A. Ya. Narmanov, G. M. Abdishukurova, “The stability of completely controllable systems”, Vestn. Udmurtsk. un-ta. Matem. Mekh. Kompyut. nauki, 32:1 (2022), 81–93
A. Ya. Narmanov, “Geometriya orbit vektornykh polei i singulyarnye sloeniya”, Sovremennye problemy matematiki i fiziki, SMFN, 65, no. 1, Rossiiskii universitet druzhby narodov, M., 2019, 54–71
Abdigappar Narmanov, Eldor Rajabov, “The Geometry of Vector Fields and two Dimensional Heat Equation”, Journal of Applied Nonlinear Dynamics, 13:3 (2024), 431–438
25.
Narmanov A.Ya., Zoyidov A.N., “GEOMETRY OF CONFORMAL SUBMERSIONS”, Uzbek Mathematical Journal, 67:1 (2023), 106-110 DOI: 10.29229/uzmj.2023-1-14
26.
A.Narmanov,E.Rajabov, “The Geometry of Vector Fields and Two
Dimensional Heat Equation”, INTERNATIONAL ELECTRONIC JOURNAL OF GEOMETRY, 16:1 (2023), 73-80
27.
A. Narmanov, S. Ergashova, “On the geometry of Liouville foliations”, E3S Web of Conferences, 402, 03032, 402:03032 (2023)
28.
A.Narmanov, J.Aslonov, “On the Geometry of the Orbits of Killing Vector Fields”, Lecture Notes in Networks and Systems, 724 (2023), 88-94
29.
Artykbaev, A. , Narmanov, A.Y. , Ismoilov, S.S., “Geometry of foliations of Minkowski spaces”, E3S Web of Conferences, 2023, 413, 03034, 413:03034 (2023)
30.
A.Narmanov, A.Sharipov, “ON THE DIFFEOMORPHISM GROUPS
OF FOLIATED MANIFOLDS”, Journal of Mathematical Sciences,, 276:6 (2023), 767–775 DOI 10.1007/s10958-023-06800-8
31.
Abdigappar Narmanov, Bekzod Diyarov1, “On the geometry of Hamiltonian vector fields”, E3S Web of Conferences, 458:09013 (2023), 1–7
32.
Abdigappar Narmanov, “TOPOLOGY OF SINGULAR FOLIATIONS”, Journal of Mathematical Sciences, 277:3 (2023), 439–445
33.
Narmanov AbdigapparBekzod Diyarov, “On geometry of two dimensional surfaces in four dimensional Euclid space”, Bulletin of National University of Uzbekistan Mathematics and Natural Sciences, 5:4 (2023), 262-268
34.
A. Y. Narmanov, “GEOMETRY OF ORBITS OF VECTOR FIELDS
AND SINGULAR FOLIATIONS”, Journal of mathematical sciences, 265:1 (2022), 52-68
35.
A. Y. Narmanov, E. O. Rajabov, “Vector fields and differential equations”, Journal of Physics: Conference Series, 2388:1 (2022), 012041
36.
A. Ya. Narmanov, B.R.Diayrov, “On the geometry of curvature lines”, Uzbek mathematical journal, 66:4 (2022), 105-112
37.
G.M.Abdishukurova, A.Ya.Narmanov, “Diffeomorphisms of foliated manifolds”, Methods of functional analysis and topology, 27:1 (2021), 1-9
38.
A. Ya. Narmanov, X.F.Sharipov, “On the geometry of submersions”, Geometry, Integrability and Quantization, 22 (2021), 199-208
39.
A. Ya. Narmanov, O.Y.Qosimov, “On the geometry of singular foliations generated by the family of vector fields”, Uzbek Matematical Journal, 65:1 (2021), 137-146
40.
A. Ya. Narmanov, S.S.Saitova, “On Geometry of Vector Fields”, Journal of Mathematical Sciences,, 245,:3 (2020), 375-381 http://link.springer.com/article/10.1007/s10958-020-04699-z
41.
Narmanov A.,Parmonov H, “On the Geometry of Hamiltonian Symmetries”, Mathematics and Statistics, 8:3 (2020), 293 - 298
42.
Narmanov Abdigappar and Qosimov Odil, “On the Geometry of the Set of Orbits of Killing Vector Fields on Euclid
Space”, Journal of Geometry and Symmetry in Physics, 55, 39-49 (2020), doi:10.7546/jgsp-55-2020-39-49 , 11 pp.
43.
Abdishukurova G, Narmanov A, Sharipov X, “Differential invariants of One Parametrical Group of Transformations”, Mathematics and Statistics, 8:3 (2020), DOI: 10.13189/ms.2020.080314 , 6 pp.
44.
A.Ya.Narmanov, Kh.F.Sharipov,, “O geometrii submersii”, Reports of Academy of science of Uzbekistan, 2020, no. 5, 6-10
45.
A.Ya.Narmanov, A.S.Sharipov, “O gruppe diffeomorfizmov sloenykh mnogoobrazii”, Reports of Academy of science of Uzbekistan, 3:5 (2019), 3-6
46.
A. Ya. Narmanov, X. F. Sharipov, “Differential invariants of submersions”, Uzbek Matematical Journal, 2018, no. 3, 132-138
47.
Narmanov A.Y., Rajabov E.O., “On the geometry of conformal vector fields”, Uzbek Matematical Journal, 2018, no. 2, 103-110
48.
A.Ya.Narmanov, E.O.Razhabov, “O geometrii konformnykh vektornykh polei”, Reports of Academy of science of Uzbekistan, 2018, no. 2, 7-11
49.
A.Ya.Narmanov, E.O.Razhabov, “Geometriya orbit konformnykh vektornykh polei”, Reports of Academy of science of Uzbekistan, 2018, no. 5, 3-6
50.
Narmanov A.Ya., Tursunov B.A“. O geometrii submersii nad orbitoi vektornykh polei Killinga.”, Uzbekskii matematicheskii zhurnal,., 2017, no. 2, 76-83
51.
Narmanov, A. Ya.; Sharipov, A. S., “Geometry of foliated manifolds”, Extracta Mathematicae, 31:2 (2016) , 9 pp.
A. Ya. Narmanov,B. Tursunov, “Geometry of submersions on manifolds of nonnegative curvature.”, Mathematica Aeterna, 2015, no. 1, 169-174 https://www.longdom.org/abstract/geometry-of-submersions-on-manifolds-of-nonnegative-curvature-4605.html
54.
Narmanov A.Ya., Tursunov B.A., “Geometriya sloenii neotritsatelnoi krivizny.”, Reports of Academy of science of Uzbekistan, 2015, no. 1, 11-12
55.
A. Ya. Narmanov, A. S. Sharipov, “On the geometry of submersions.”, International journal of geometry, 3:2 (2014), 51-56 https://ijgeometry.com/vol-3-2014-no-2-october/
A. Ya. Narmanov, B. Tursunov, “Geometry of foliations of non-negative curvature”, Uzbek mathematical journal, 2013, no. 3, 78-84 https://uzmj.mathinst.uz/archive–2002-2017-.html
58.
A. Ya. Narmanov,S.S.Saitova, “On the geometry of Killing vector fields”, Reports of Academy of science of Uzbekistan, 2013, no. 5
59.
Kasimov O, Narmanov, A., “On the geometry of Sin-gular Riemannian foliations of sphere small dimensions”, Reports of Academy of science of Uzbekistan, 2013, no. 2
A. Ya. Narmanov, J. Aslonov, “Geometry of orbit of Killing vector fields”, Uzbek mathematical journal, 2012, no. 2, 77-85 https://uzmj.mathinst.uz/archive–2002-2017-.html
62.
A. Ya. Narmanov, J.O.Aslonov, On the geometry of the orbits of killing vector fields, 2012 , 6 pp., arXiv: https://arxiv.org/pdf/1203.3690.pdf
63.
A.Ya. Narmanov, G. Kaypnazarova, Foliation Theory and its applications, 2012 , 16 pp., arXiv: https://arxiv.org/abs/1204.0861
64.
Sharipov, A. S.; Narmanov, A. Ya., “On the isometries of foliated manifold. (English)”, TWMS J. Pure Appl. Math. 2,, 2:1 (2011), WOS:000218984800012 , 8 pp.
65.
Narmanov, A. Ya.; Kaypnazarova, G., “Foliation theory and its applications.”, TWMS J. Pure Appl. Math., 2:1 (2011), WOS:000218984800011 , 15 pp.
66.
Mammadova, Gamar (ed.); El Zein, Fouad (ed.); Langevin, R{\e}mi (ed.); Narmanov, Abdigappar (ed.); Soleev, Ahmadjon (ed., “Special issue: Selected papers based on the presentations at the international school and conference on foliations, dynamical systems, singularity theory and perverse sheaves, Samarkand, Uzbekistan, October 6–21, 2009. (English)”, TWMS J. Pure Appl. Math. 2,, 2:1 (2011), WOS:000218984800001 , 150 pp.
67.
A. Ya. Narmanov, O.Kasimov, “Geometry of singular riemannian foliations”, Uzbek Matematical Journal, 2011, no. 3 , 7 pp.
68.
A. Ya. Narmanov, G.Kaipnazarova, “Metric functions on riemannian manifolds”, Uzbek Matematical Journal, 2010, no. 2, 113-120 https://uzmj.mathinst.uz/archive–2002-2017-.html
69.
A. Ya. Narmanov, Urazmetova Sh, “Geodesic mappings of foliated manifold.”, Reports of Academy of science of Uzbekistan, 2010, no. 3, 15-19
70.
A. Ya. Narmanov,G.Kaipnazarova, “On the topology of foliations”, Vestnik Kirgiz-Russian Slavyan University, 10:9 (2010), 12-15
71.
A. Ya. Narmanov, A. S. Sharipov, “On the group of foliation isometries”, Methods of functional analysis and topology, 15:2 (2009), 195-200 http://mfat.imath.kiev.ua/volumes/issues/?year=2009&number=2
72.
A. Ya. Narmanov, A. S. Sharipov, “About some applications of foliation theory in control problems”, Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 2008, no. 2, 93–96
73.
A. Ya. Narmanov, A. S. Sharipov, “On the geometry of Accessible sets”, Vestnyk of Tambow University, seriya natural and technical sciences, 12:4 (2007), 501-503
74.
A. Ya. Narmanov, “Stability of completely controllable systems”, Izv. IMI UdGU, 2006, no. 3(37), 107–108
75.
A. Ya. Narmanov,Kaypnazarova G, “On the gradient lines”, Reports of Academy of science of Uzbekistan, 2006, no. 4, 15-19
76.
A. Ya. Narmanov, J.,Aslonov ., “On the dynamical systems on torus.”, Reports of Academy of science of Uzbekistan, 2006, no. 2, 38-41
77.
A. Ya. Narmanov, S. Sharapov, “On the foliations generated by submersions”, Reports of Academy of science of Uzbekistan, 2 (2005), 8-11
78.
Narmanov A.Ya.,Sharapov S., “On the level surfaces of submersions.”, Uzbek Matematical Journal, 2004, no. 2, 62-66
79.
A. Ya. Narmanov, A. S. Sharipov, “On the dependence of controllability sets from target point.”, Reports of Academy of science of Uzbekistan, 2004, no. 1, 11-14
80.
A. Ya. Narmanov, Skorobogatov D, “Izometric maps of foliations”, Reports of Academy of science of Uzbekistan, 2004, no. 1, 12-16
81.
A. Ya. Narmanov, “On the class of some submersions”, Uzbek Matematical Journal, 2003, no. 2, 29-36
82.
A. Ya. Narmanov,A. Boyturaev, “On the class of submersions”, GEOMETRY and Foliations. (Ryukoku University, Fukakusa, Kyoto, Japan, September 10-19, 2003), 2003, 361-367
83.
A. Ya. Narmanov, N.Satimov, M.Tuxtasinov, “On the topologycal proposition”, Reports of Academy of science of Uzbekistan, 2002, no. 1, 9-11
A. Ya. Narmanov, “On the diferential geometry of singular foliations”, Reports of Academy of science of Uzbekistan, 1996, no. 5, 9-10
86.
A. Ya. Narmanov, “On the geometry of distributions”, Uzbek Matematical Journal, 1996, no. 2, 93-100
87.
A. Ya. Narmanov, “On the structure of Riemannian manifold with totally geodesic Riemannian foliation”, Reports of Academy of science of Uzbekistan, 1996, no. 1
88.
A.Ya.Narmanov, “O golonomii rimanovykh sloenii s osobennostyami”, Doklady Akademii Nauk Respubliki Uzbekistan, 1996, no. 3, 6-7
A. Ya. Narmanov, “On the stability of complete controllable dydtems”, Uzbek Matematical Journal, 1991, no. 12, 34-37
93.
A. Ya. Narmanov, “On the stability of totally controllable systems”, Reports of Academy of science of Uzbekistan, 1990, no. 6, 7-10
94.
A. Ya. Narmanov, “On the holonomy group of codimension one foliations”, Izvestiya of Academy of science of Uzbekistan, 1989, no. 7, 35-37
95.
A.Ya.Narmanov, “O gruppe golonomii sloenii korazmernosti odin”, Izvestiya Akademii Nauk Uz.SSR, 1986, no. 7, 35-37
96.
A. Ya. Narmanov, N.N. Petrov, “Nonlocal problems in the theory of optimal processes. II.”, Differentsialʹnye Uravneniya, 21:6 (1985), 955-962
97.
Narmanov, A. Ya, “Limit sets of leaves of a foliation of codimension”, (Russian) Vestnik Leningrad. Univ. Mat. Mekh. Astronom. ., 1983, no. 3, WOS:A1983RQ18300019 , 5 pp.
98.
Narmanov, A. Ya., “A stability theorem for noncompact leaves of a foliation of codimension one.”, Vestn. Leningr. Univ. Mat. Mekh. Astron., 1983, no. 19, WOS:A1983RD75500004 , 4 pp.
A.Ya.Narmanov, “Mnozhestvo upravlyaemosti i problemy Nishimori”, Referativnyi zhurnal «Matematika», 1983.Refe-rat #11,115911, 11, VINITI, 1983, 115911
101.
Narmanov, A. Ya, “On the structure of the controllability set of continuously balanced control systems. (Russian)”, (Russian) Vestnik Leningrad. Univ. Mat. Mekh. Astronom. ., 1981, no. 13, WOS:A1981MC68200009 , 6 pp.
102.
A. Ya. Narmanov, O. Y. Qasimov, E. O. Rajabov, “On geometry of conformal vector fields”, Algebra, geometry, differential equations, Itogi Nauki i Tekhniki. Ser. Sovrem. Mat. Pril. Temat. Obz., 216, VINITI, Moscow, 2022, 97–105
103.
A. Ya. Narmanov, “Stability of completely controllable systems”, Geometry and topology, Itogi Nauki i Tekhniki. Ser. Sovrem. Mat. Pril. Temat. Obz., 197, VINITI, Moscow, 2021, 28–35
104.
A. Ya. Narmanov, N. N. Petrov, “Nonlocal problems in the theory of optimal processes. II”, Differ. Uravn., 21:6 (1985), 955–962
Presentations in Math-Net.Ru
1.
Î ãåîìåòðèè âåêòîðíûõ ïîëåé A. Ya. Narmanov Seminar of Laboratory of Theory of Functions "Modern Problems of Complex Analysis" March 22, 2018 12:00