flexible polyhedra,
rigid framework,
polytopes,
surfaces in Euclidean space,
global surface theory,
mechanisms,
kinematics,
Lobachevskij geometry.
Subject:
Convex and discrete geometry. The theory of flexible polyhedra.
Main publications:
Alexandrov, Victor, “The spectrum of the Laplacian in a domain bounded by a flexible polyhedron in $\mathbb{R}^d$ does not always remain unaltered during the flex”, Journal of Geometry, 111:2 (2020), Paper No. 32, 14 p.
Alexandrov, Victor, “Why there is no an existence theorem for a convex polytope with prescribed directions and perimeters of the faces?”, Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg, 88:1 (2018), 247-254
Alexandrov, Victor, “Minkowski-type and Alexandrov-type theorems for polyhedral herissons”, Geometriae Dedicata, 107 (2004), 169-186
Alexandrov, Victor, “Implicit function theorem for systems of polynomial equations with vanishing Jacobian and its application to flexible polyhedra and frameworks”, Monatshefte für Mathematik, 132:4 (2001), 269-288
Alexandrov, Victor, “An example of a flexible polyhedron with nonconstant volume in the spherical space”, Beiträge zur Algebra und Geometrie, 38:1 (1997), 11-18
V. A. Aleksandrov, “A new example of a flexible polyhedron”, Siberian Math. J., 36:6 (1995), 1049–1057
6.
V. A. Aleksandrov, “On the isometricity of polyhedral domains whose boundaries are locally isometric in relative metrics”, Siberian Math. J., 33:2 (1992), 177–182
7.
V. A. Aleksandrov, “Isometry of domains in $R^n$ and relative isometry of theirs boundaries”, Siberian Math. J., 25:3 (1984), 339–347
8.
Victor Alexandrov, “Algebra versus analysis in the theory of flexible polyhedra”, Aequationes Mathematicae, 79:3 (2010), 229–235 , arXiv: 0902.0186
Victor Alexandrov, “Implicit function theorem for systems of polynomial equations with vanishing Jacobian and its application to flexible polyhedra and frameworks”, Monatshefte fur Mathematik, 132:4 (2001), 269–288 , arXiv: math/0006126
V. A. Aleksandrov, “An example of a one-dimensional rigid set in the plane”, Siberian Math. J., 34:6 (1993), 999–1004
12.
V. A. Aleksandrov, “Remarks to Sabitovs conjecture on volume rigidity with infinitesimal bending of a surface”, Siberian Math. J., 30:5 (1989), 678–684
13.
Victor Alexandrov, “Necessary conditions for the extendibility of a first-order flex of a polyhedron to its flex”, Beiträge zur Algebra und Geometrie, 61:2 (2020), 355-368 , arXiv: 1906.11433
Victor Alexandrov, Robert Connelly, “Flexible suspensions with a hexagonal equator”, Illinois Journal of Mathematics, 55:1 (2011), 127–155 , arXiv: 0905.3683
V. A. Aleksandrov, “Isometry of domains in $R^n$ and relative isometry of their boundaries. II”, Siberian Math. J., 26:6 (1985), 783–787
16.
V. A. Alexandrov, “Recognition of affine-equivalent polyhedra by their natural developments”, Siberian Mathematical Journal, 64:2 (2023), 269–286 , arXiv: 2106.13659
17.
V. Alexandrov, H. Maehara, A. D. Milka, I. Kh. Sabitov, J.-M. Schlenker, B. Servatius, H. Servatius, “Problem section”, European Journal of Combinatorics, 31:4 (2010), 1196-1204
Victor Alexandrov, “Why there is no an existence theorem for a convex polytope with prescribed directions and perimeters of the faces?”, Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg, 88:1 (2018), 247–254 , arXiv: 1707.08288
Victor Alexandrov, “An analogue of a theorem of van der Waerden, and its application to two-distance preserving mappings”, Periodica Mathematica Hungarica, 72:2 (2016), 252–257 , arXiv: 1504.03870
V. A. Aleksandrov, “On the Gale–Nikaidô–Inada fundamental theorem on univalence of mappings”, Siberian Math. J., 35:4 (1994), 637–639
23.
V. A. Aleksandrov, “On interrelation between the problem of unique determination of a domain in $R^n$ and a problem of recovery of a locally Euclidean metric”, Siberian Math. J., 33:4 (1992), 732–736
24.
V. A. Aleksandrov, “Estimate of deformation of strictly convex domain under deformation of relative metric of its boundary”, Siberian Math. J., 31:5 (1990), 711–716
25.
V. Alexandrov, “On domains uniquely defined by the relative metrics of their boundaries”, Trudy Inst. Mat. Sib. Otd. AN SSSR, 7 (1987), 5–19
26.
V. A. Alexandrov, “On the existence of two affine-equivalent frameworks with prescribed edge lengths in Euclidean $d$-space”, Siberian Mathematical Journal, 64:6 (2023), 1273–1278 , arXiv: 2306.13859
27.
V. A. Aleksandrov, O. A. Bogoyavlenskaya, A. P. Ulyanov, “Higher Mathematics Chair of the Physics Department at Novosibirsk State University”, Siberian Journal of Physics, 17:1 (2022), 94-103
28.
Victor Alexandrov, “How to decide whether two convex octahedra are affinely equivalent using their natural developments only”, Journal for Geometry and Graphics, 26:1 (2022), 29-38heldermann.de/JGG/JGG26/JGG261/jgg26007.htm, arXiv: 2203.05305
29.
Victor Alexandrov, “Around Efimovs differential test for homeomorphism”, Beiträge zur Algebra und Geometrie, 62:1 (2021), 7-20 , arXiv: 2006.15322
30.
Victor Alexandrov, “A note on the first-order flexes of smooth surfaces which are tangent to the set of all nonrigid surfaces”, Journal of Geometry, 112:3 (2021), Paper No. 41 , 7 pp., arXiv: 2109.03503
31.
Victor Alexandrov, “The spectrum of the Laplacian in a domain bounded by a flexible polyhedron in $\mathbb R^d$ does not always remain unaltered during the flex”, Journal of Geometry, 111:2 (2020), Paper No. 32 , 14 pp., arXiv: 1809.00322
32.
Victor Alexandrov, “How many times can the volume of a convex polyhedron be increased by isometric deformations?”, Beiträge zur Algebra und Geometrie, 58:3 (2017), 549–554 , arXiv: 1607.06604
33.
Victor Alexandrov, “On the number of solutions of a quadratic equation in a normed space”, Journal of Natural Science of Heilongjiang University, 33:1 (2016), 1–5 , arXiv: 1506.02474
34.
V. A. Alexandrov, “The set of nondegenerate flexible polyhedra of a prescribed combinatorial structure is not always algebraic”, Siberian Math. J., 56:4 (2015), 569–574 , arXiv: 1508.03960
35.
Victor Alexandrov, “Continuous deformations of polyhedra that do not alter the dihedral angles”, Geometriae Dedicata, 170:1 (2014), 335–345 , arXiv: 1212.4676
36.
Victor Alexandrov, “An analytical approach to the Rational Simplex Problem”, Journal of Natural Science of Heilongjiang University, 30:5 (2013), 561–565 , arXiv: 1304.7464
37.
Victor Alexandrov, “Around the A. D. Alexandrov's theorem on a characterization of a sphere”, Sib. Èlektron. Mat. Izv., 9 (2012), 639–652 (Published online) , arXiv: 1212.5047
38.
Victor Alexandrov, “On a differential test of homeomorphism, found by N.V. Efimov”, Contemporary Problems of Mathematics and Mechanics (Sovremennye Problemy Matematiki i Mekhaniki), 6:2 (2011), 18–26 (Published online) , arXiv: 1010.3637
39.
Victor Alexandrov, “New manifestations of the Darboux's rotation and translation fields of a surface”, New Zealand Journal of Mathematics, 40 (2010), 59–65 , arXiv: 0910.5164
40.
Victor Alexandrov, Nadezhda Alexandrova, Gunter Weiss, Simplices with equiareal faces, 2009 (Published online) , 6 pp., arXiv: 0909.1859
41.
Victor Alexandrov. Natalia Kopteva, S. S. Kutateladze, “Blaschke addition and convex polyhedra”, Tr. Semin. Vektorn. Tenzorn. Anal., 26 (2005), 8-30 (Published online) , arXiv: math/0502345
42.
V. A. Aleksandrov, In'ektivnye otobrazheniya i metricheskie svoistva izgibaemykh mnogogrannikov, "Diss. … dokt. fiz.-matem. nauk, Rossiiskaya akademiya nauk, Sibirskoe otdelenie, Institut matematiki im. S. L. Soboleva, Novosibirsk, 2004 , 160 pp.
43.
Victor Alexandrov, “Sufficient conditions for the extendibility of an $N$-th order flex of polyhedra”, Beiträge zur Algebra und Geometrie, 39:2 (1998), 367–378
44.
Victor Alexandrov, “An example of a flexible polyhedron with nonconstant volume in the spherical space”, Beiträge zur Algebra und Geometrie, 38:1 (1997), 11–18
45.
Victor Alexandrov, “A new example of a flexible polyhedron”, Symmetry: Culture and Science, 6:1 (1995), 34–37
46.
V. A. Aleksandrov, N. S. Dairbekov, “Remarks on the theorem of M. and S. Radulescu about an initial value problem for the differential equation $x^{(n)}=f(t,x)$”, Revue Roumaine de Mathématiques Pures et Appliquées, 37:2 (1992), 95–102
47.
V. A. Aleksandrov, “Immersions of locally euclidean and conformally flat metrics”, Math. USSR-Sb., 73:2 (1992), 467–478
48.
V. A. Alexandrov, “Remarks on Efimovs theorem about differential tests of homeomorphism”, Revue Roumaine de Mathématiques Pures et Appliquées, 36:3-4 (1991), 101–105
49.
V. A. Aleksandrov, “Ob oblastyakh, odnoznachno opredelyaemykh otnositelnoi metrikoi svoei granitsy”, Issledovaniya po geometrii i matematicheskomu analizu, Trudy Instituta matematiki, 7, eds. Yu. G. Reshetnyak, Novosibirsk: Nauka, 1987, 9–15
50.
V. A. Aleksandrov, Izometrichnost oblastei v $R^n$ i otnositelnaya izometrichnost ikh granits, “Diss. … kand. fiz.-matem. nauk”, Akademiya nauk SSSR, Sibirskoe otdelenie, Institut matematiki, Novosibirsk, 1986 , 117 pp.
51.
V. A. Aleksandrov, A. A. Borisenko, Yu. F. Borisov, Yu. D. Burago, V. V. Vershinin, E. P. Volokitin, L. I. Kononenko, S. S. Kutateladze, Yu. G. Reshetnyak, E. D. Rodionov, A. S. Romanov, S. A. Treskov, V. A. Sharafutdinov, “Viktor Andreevich Toponogov (obituary)”, Russian Math. Surveys, 61:2 (2006), 341–345
52.
V.A. Aleksandrov, N.S. Dairbekov, “Problem E-3354”, The American Mathematical Monthly, 96:9 (1989), 838 https://www.jstor.org/stable/2324852
V. Aleksandrov, “Problem M2747”, Kvant, 2023, no. 5, 28 (This problem is published in the “Kvant's Problem Section”. Its solution is published in Kvant, 2023, No. 8, 17–18; see www.mathnet.ru/eng/kvant4214.)
54.
V. A. Aleksandrov, V. I. Arnol'd, A. A. Borisenko, Yu. F. Borisov, V. A. Zalgaller, S. S. Kutateladze, V. A. Marchenko, A. D. Milka, Yu. G. Reshetnyak, I. Kh. Sabitov, “Aleksei Vasil'evich Pogorelov (obituary)”, Russian Math. Surveys, 58:3 (2003), 593–596
V. A. Alexandrov, L. D. Beklemishev, V. M. Buchstaber, A. Yu. Vesnin, A. A. Gaifullin, N. P. Dolbilin, N. Yu. Erokhovets, M. D. Kovalev, V. S. Makarov, S. P. Novikov, D. O. Orlov, A. N. Parshin, I. Kh. Sabitov, D. V. Treschev, O. K. Sheinman, E. V. Shchepin, “Mikhail Ivanovich Shtogrin (on his 80th birthday)”, Russian Math. Surveys, 74:6 (2019), 1159–1162
57.
V. A. Aleksandrov, V. A. Belonogov, V. N. Berestovskii, A. A. Borisenko, M. K. Valiev, A. Yu. Vesnin, V. V. Vershinin, S. K. Vodopyanov, E. P. Volokitin, V. M. Goldshtein, V. G. Dudnik, L. I. Kononenko, A. P. Kopylov, Ya. A. Kopylov, A. V. Kuzminykh, A. G. Kusraev, S. S. Kutateladze, Yu. G. Nikonorov, G. G. Pestov, G. S. Plesnevich, Yu. G. Reshetnyak, E. D. Rodionov, A. S. Romanov, A. I. Rylov, I. Kh. Sabitov, V. V. Slavskii, V. B. Tarasov, S. A. Treskov, “Vladimir Kuzmich Ionin (Obituary)”, Vladikavkazskii matematicheskii zhurnal, 16:1 (2014), 80–85
58.
V. A. Aleksandrov, “The first acquaintance with the tensor (in Russian)”, Bulletin of the Novosibirsk State University. Series: Physics, 7:1 (2012), 100–117 , arXiv: 1311.6983
59.
Victor Alexandrov, “Erratum to: Algebra versus analysis in the theory of flexible polyhedra”, Aequationes Mathematicae, 81:1 (2011), 199
60.
V. A. Aleksandrov, Yu. A. Aminov, V. M. Buchstaber, V. A. Vassiliev, N. P. Dolbilin, S. P. Novikov, Yu. G. Reshetnyak, V. A. Sadovnichii, V. T. Fomenko, “Idzhad Khakovich Sabitov (on his 70th birthday)”, Russian Math. Surveys, 63:6 (2008), 1173–1177
61.
Victor Alexandrov, “Sobolev Institute of Mathematics celebrates its fiftieth anniversary”, Notices of the American Mathematical Society, 54:10 (2007), 1512–1514www.ams.org/journals/notices/200711/tx071101512p.pdf
62.
V. A. Aleksandrov, “The chair of higher mathematics”, Bulletin of Novosibirsk State University. Ser. Physics, 1:1 (2006), 110-116
63.
V. A. Aleksandrov, Generalized Functions (in Russian), Student textbook series of NSU, Novosibirsk State University, Novosibirsk, 2005 , 46 pp.
V. A. Aleksandrov, Yu. F. Borisov, Yu. D. Burago, A. L. Verner, S. S. Kutateladze, Yu. G. Reshetnyak, “Viktor Abramovich Zalgaller (on his 80th birthday)”, Russian Math. Surveys, 56:5 (2001), 1013–1014
V. A. Aleksandrov, “Kak smyat paket ot moloka, chtoby v nego voshlo bolshe”, Sorosovskii obrazovatelnyi zhurnal, 6:2 (2000), 121–127
70.
V. A. Aleksandrov, “Izgibaemye mnogogrannye poverkhnosti”, V knige: V. N. Soifer (red.), Yu. P. Solovev (red.) Sovremennoe estestvoznanie. Entsiklopediya. T. 3: matematika i mekhanika. M.: Nauka. M.: Flinta, 2000
V. A. Aleksandrov, E. V. Kolesnikov, The Integral Equations (in Russian), Student textbook series of NSU, Novosibirsk State University, Novosibirsk, 1993 , 47 pp.