Kyrov Vladimir Aleksandrovich

Publications in Math-Net.Ru

1. Weingarten equations for surfaces on Helmholtz-type groups
   
   Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 235 (2024),  68–77
2. On the local extension of the group of parallel translations in three-dimensional space. II
   
   Vladikavkaz. Mat. Zh., 26:2 (2024),  54–69
3. Solutions of some systems of functional equations related to complex, double, and dual numbers
   
   Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 229 (2023),  37–46
4. On the local extension of the group of parallel translations of four-dimensional space
   
   Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 225 (2023),  87–107
5. Solution of three systems of functional equations related to complex, double and dual numbers
   
   Izv. Vyssh. Uchebn. Zaved. Mat., 2023, no. 7,  42–51
6. Left-invariant metrics of some three-dimensional Lie groups
   
   Mathematical notes of NEFU, 30:4 (2023),  24–36
7. Analytical embedding for geometries of constant curvature
   
   Chebyshevskii Sb., 23:3 (2022),  133–146
8. Local extension of the translation group of a plane to a locally doubly transitive transformation Lie group of the same plane
   
   Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 204 (2022),  85–96
9. On locally boundedly exactly doubly transitive lie groups of transformations of the space with a subgroup of parallel translations
   
   Mat. Tr., 25:2 (2022),  126–148
10. Curves in the geometry of a special extension of Euclidean space
    
    Mathematical notes of NEFU, 29:1 (2022),  3–12
11. Nondegenerate canonical solutions of a certain system of functional equations
    
    Vladikavkaz. Mat. Zh., 24:1 (2022),  44–53
12. On local extension of the group of parallel translations in three-dimensional space
    
    Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 32:1 (2022),  62–80
13. Solution of the embedding problem for two-dimensional and three-dimensional geometries of local maximum mobility
    
    Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 194 (2021),  124–143
14. Analytic embedding of pseudo-Helmholtz geometry
    
    Izv. Saratov Univ. Math. Mech. Inform., 21:3 (2021),  294–304
15. Nondegenerate canonical solutions of one system of functional equations
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2021, no. 8,  46–55
16. Multiply transitive Lie group of transformations as a physical structure
    
    Mat. Tr., 24:2 (2021),  81–104
17. To the question of local extension of the parallel translations group of three-dimensional space
    
    Vladikavkaz. Mat. Zh., 23:1 (2021),  32–42
18. Hypercomplex numbers in some geometries of two sets. II
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2020, no. 5,  39–54
19. Commutative hypercomplex numbers and the geometry of two sets
    
    J. Sib. Fed. Univ. Math. Phys., 13:3 (2020),  373–382
20. Аналитическое вложение геометрий со скалярным произведением
    
    Mat. Tr., 23:1 (2020),  150–168
21. Analytic embedding of geometries of constant curvature on a pseudosphere
    
    Izv. Saratov Univ. Math. Mech. Inform., 19:3 (2019),  246–257
22. Analytic embedding of some two-dimensional geometries of maximal mobility
    
    Sib. Èlektron. Mat. Izv., 16 (2019),  916–937
23. Analytic embedding of three-dimensional simplicial geometries
    
    Trudy Inst. Mat. i Mekh. UrO RAN, 25:2 (2019),  125–136
24. Analytical embedding of three-dimensional Helmholtz-type geometries
    
    Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 29:4 (2019),  532–547
25. The embedding of multidimensional special extensions of pseudo-Euclidean geometries
    
    Chelyab. Fiz.-Mat. Zh., 3:4 (2018),  408–420
26. The analytical method for embedding multidimensional pseudo-Euclidean geometries
    
    Sib. Èlektron. Mat. Izv., 15 (2018),  741–758
27. The groups of motions of some three-dimensional maximal mobility geometries
    
    Sibirsk. Mat. Zh., 59:2 (2018),  412–421
28. On a family of functional equations
    
    Vladikavkaz. Mat. Zh., 20:3 (2018),  69–77
29. On the embedding of two-dimetric phenomenologically symmetric geometries
    
    Vestn. Tomsk. Gos. Univ. Mat. Mekh., 2018, no. 56,  5–16
30. Embedding of an additive two-dimensional phenomenologically symmetric geometry of two sets of rank $(2,2)$ into two-dimensional phenomenologically symmetric geometries of two sets of rank $(3,2)$
    
    Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 28:3 (2018),  305–327
31. Solving of functional equations associated with the scalar product
    
    Chelyab. Fiz.-Mat. Zh., 2:1 (2017),  30–45
32. Hypercomplex numbers in some geometries of two sets. I
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2017, no. 7,  19–29
33. The analytic method of embedding symplectic geometry
    
    Sib. Èlektron. Mat. Izv., 14 (2017),  657–672
34. An analytic method for the embedding of the Euclidean and pseudo-Euclidean geometries
    
    Trudy Inst. Mat. i Mekh. UrO RAN, 23:2 (2017),  167–181
35. Embedding of phenomenologically symmetric geometries of two sets of rank $(N,M)$ into phenomenologically symmetric geometries of two sets of rank $(N+1,M)$
    
    Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 27:1 (2017),  42–53
36. On a class of functional equations
    
    Mathematical Physics and Computer Simulation, 20:5 (2017),  17–26
37. The pseudo-Helmholtz and dual Helmholtz planes with the Finsler geometry
    
    Vestn. Tomsk. Gos. Univ. Mat. Mekh., 2016, no. 6(44),  5–18
38. The properly Helmholtz plane as Finsler geometry
    
    Vestn. Tomsk. Gos. Univ. Mat. Mekh., 2016, no. 4(42),  15–22
39. Embedding of phenomenologically symmetric geometries of two sets of the rank $(N,2)$ into phenomenologically symmetric geometries of two sets of the rank $(N+1,2)$
    
    Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 26:3 (2016),  312–323
40. Projective geometry and phenomenological symmetry
    
    J. Sib. Fed. Univ. Math. Phys., 5:1 (2012),  82–90
41. The Lie Algebra of the Group of Motions of a Phenomenologically Symmetric Geometry
    
    Mat. Zametki, 91:2 (2012),  312–315
42. On some class of functional-differential equations
    
    Vestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.], 1(26) (2012),  31–38
43. Functional equations in pseudo-Euclidean geometry
    
    Sib. Zh. Ind. Mat., 13:4 (2010),  38–51
44. Functional equations in symplectic geometry
    
    Trudy Inst. Mat. i Mekh. UrO RAN, 16:2 (2010),  149–153
45. Phenomenologically symmetrical local Lie groups of transformations of the space $R^s$
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2009, no. 7,  10–21
46. Criterion for the Nondegeneracy of a Transformation Group
    
    Mat. Zametki, 85:1 (2009),  144–146
47. Критерий невырожденности $sn(n+1)/2$-параметрической группы Ли преобразований пространства $\mathbb R^{sn}$
    
    Sib. Zh. Ind. Mat., 12:1 (2009),  109–113
48. Some of Transformation Groups and Their Invarians
    
    Vestn. Novosib. Gos. Univ., Ser. Mat. Mekh. Inform., 9:3 (2009),  54–63
49. Projective geometry and the theory of physical structures
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2008, no. 11,  48–59
50. Classification of four-dimensional transitive local Lie groups of transformations of the space $R\sp 4$ and their two-point invariants
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2008, no. 6,  29–42
51. Affine Geometry as a Physical Structure
    
    J. Sib. Fed. Univ. Math. Phys., 1:4 (2008),  460–464
52. On quasigroups arising from physical structure of $(2,2)$ rank
    
    Prikl. Diskr. Mat., 2008, no. 2(2),  12–14
53. Three-basal quasigroup with generalized Word's identity
    
    Prikl. Diskr. Mat., 2008, no. 1(1),  21–24
54. Two-metric spaces
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2005, no. 8,  27–38
55. Two-dimensional Helmholtz spaces
    
    Sibirsk. Mat. Zh., 46:6 (2005),  1341–1359