Transient wave processes in block and elastic media. Analytical and numerical methods in solid mechanics. Special functions in solid mechanics.
Biography
Nadezhda Ivanovna Aleksandrova (maiden name Pinchukova) was born on January 10, 1957 in Russia,
in the village of Severnoye, Severny District, Novosibirsk Region.
Her parents, Ivan Nikiforovich Pinchukov (1921–2003) and Anna Mikhailovna Pinchukova (1923–2002; maiden
name Eremina), were teachers at the Severnoye Secondary School.
Nadezhda had two older sisters, Olga and Galina, and an older brother, Vladimir.
In 1973, she graduated from Severnoye Seconady School and became a student of the Department of Mechanics and Mathematics
of Novosibirsk State University (NSU).
In 1978, she graduated from NSU with honors and was hired as an intern researcher at the Institute of Mining of the
Siberian Branch of the Academy of Sciences of the Soviet Union.
In this Institute, which is located in Novosibirsk, Russia and is now called the N.A. Chinakal Institute of Mining of the
Siberian Branch of the Russian Academy of Sciences, Nadezhda worked until the end of her life, consistently helding all
scientific positions from an intern to chief researcher.
In 1983, Nadezhda defended her dissertation for the degree of Candidate of Physical and Mathematical Sciences
(majoring in Solid Mechanics), which corresponds to Ph.D. in Solid Mechanics.
The scientific supervisor was Dr. Mark V. Stepanenko.
The dissertation was defended at the M.A. Lavrentyev Institute of Hydrodynamics of the Siberian Branch of the
Academy of Sciences of the Soviet Union in Novosibirsk.
In 1986, Nadezhda married mathematician Victor A. Alexandrov and accepted her husband’s surname.
The family had a son, Alexey, who became a programmer.
From 1992 to 2009 Nadezhda taught students at the Higher Mathematics Chair of the Physics Department at NSU.
Working part-time, she successively held the positions equivalent to Assistant Professor and Associate Professor.
In 2004, the Higher Attestation Commission (in Moscow) awarded Nadezhda the Docent academic rank.
In 2015, Nadezhda defended her dissertation for the degree of Doctor of Physical and Mathematical Sciences
(with major in Solid Mechanics), which corresponds to habilitation in Solid Mechanics.
Dr. Evgeny N. Sher served as the scientific consultant.
The dissertation was defended at the at the M.A. Lavrentyev Institute of Hydrodynamics of the Siberian Branch of the
Russian Academy of Sciences in Novosibirsk.
Nadezhda died on December 20, 2023 in Novosibirsk after a four-year battle with cancer.
She is buried in Novosibirsk at the Southern Cemetery.
* * * * *
Nadezhda's main scientific interests lay in the study of the propagation of waves in elastic shells, as well as elastic and block media.
But sometimes the results she obtained went beyond the scope of solid mechanics itself, and then she published articles on
computational mathematics or special functions.
In particular, she found new asymptotic representations of the Lommel function and its derivative through the Scorer function.
In her work, Nadezhda sometimes used classical models (for example, that of an elastic shell or of an elastic medium),
and sometimes she proposed her own model (primarily when she studied block media).
Usually Nadezhda solved the problem numerically, and, when analyzing the finite-difference solution obtained, used
either known exact solutions, or asymptotic estimates of exact solutions obtained by herself.
To find numerical solutions, Nadezhda have never used ready-made software products for engineering calculations.
She always chose the finite-difference algorithm for solving the problem herself and coded it “from scratch” in order to
know exactly how the calculations were carried out and to be able to monitor the accuracy of the calculations.
Nadezhda was always interested in finding asymptotic estimates for exact solutions of mechanical problems under study.
She used them to test finite difference algorithms which she proposed.
She sometimes also compared the results of numerical calculations with the results of laboratory or field experiments,
performed by her colleagues, who in this case became her co-authors.
From 1978 to 1996 Nadezhda studied mainly various types of waves arising on elastic shells (often immersed in a liquid or
filled with a liquid) as a result of external (for example, shock) loads.
During this period of time, not all results of Nadezhda's research were published in the form of articles in scientific journals
(most of those articles are put on the list of publications on her page on this site).
Some of her results were published in technical reports, information about which is currently not possible to find.
In general, we can say that the research carried out by Nadezhda from 1978 to 1996 are close to the topic of her Ph.D. thesis.
From 1997 to 2023 Nadezhda mainly studied various types of waves arising in block media and on their boundaries,
including studying Rayleigh surface waves at the boundary of a block medium.
For example, her article “Seismic waves in a three-dimensional block medium” (2016) is devoted to studying the
differences in the behavior of a block medium and a homogeneous elastic medium.
Among other things, this article shows that, in a block medium, waves propagate with dispersion, which is absent in
a homogeneous elastic medium, and that on the bounadry of a block medium, low-frequency longitudinal and Rayleigh
waves propagate at velocities much lower than the corresponding velocities in the blocks.
In this paper, the propagation of seismic waves in a three-dimensional block medium was studied numerically, and then
the obtained numerical solutions were compared with known analytical solutions for an elastic medium.
In general, we can say that the research carried out by Nadezhda from 1998 to 2023 are close to the topic of her habilitation dissertation.
Considering the constant interest of Nadezhda to finding asymptotic solutions and asymptotic estimates of exact solutions
for the mechanics problems she studied, it is not surprising that sometimes she had a desire to share her discoveries not
only with mechanics, but also with mathematicians.
In these cases, she published articles in mathematical journals and gave talks at mathematical seminars and conferences.
For example, by using special functions to solve problems in solid mechanics, she found new asymptotic representations of
the Lommel function and its derivative through the Scorer function.
As part of her teaching activities, Nadezhda published two textbooks for first-year students of the Physics Department at NSU
(namely, “Seminars on Higher Algebra and Analytic Geometry” and “Seminars on Linear Algebra and Differential Geometry”)
and one textbook for Ph.D. students majoring in geomechanics (namely, “Lectures on topic `Pendulum waves' within the
course `Nonlinear geomechanics'").
The reader can learn more about Nadezhda's scientific and teaching activities using the list
of her publications on her page on this site.
Victor A. Alexandrov, December 31, 2023
Main publications:
N. I. Aleksandrova, “Seismic waves in a three-dimensional block medium”, Proceedings of the Royal Society of London. A. Mathematical, Physical and Engineering Sciences, 472:2192 (2016), Article ID 20160111, 16 p
N. I. Aleksandrova, “Asymptotic formulae for the Lommel and Bessel functions and their derivatives”, Royal Society Open Science, 1:140176 (2014), 16 p.
N. I. Aleksandrova, “The discrete Lamb problem: Elastic lattice waves in a block medium”, Wave motion, 51:5 (2014), 818-832
N. I. Aleksandrova, “Asymptotic solution of the anti-plane problem for a two-dimensional lattice”, Doklady Physics, 59:3 (2014), 129-132
N. I. Aleksandrova, “Elastic wave propagation in block medium under impulse loading”, Journal of Mining Science, 39:6 (2003), 556-564
Nadezhda I. Aleksandrova, Transient longitudinal waves in 2D square lattices with Voigt elements under concentrated loading, 2023 (Published online) , 23 pp., arXiv: 2401.04121
2.
N. I. Aleksandrova, “Model of block media taking into account internal friction”, Mechanics of Solids, 57:3 (2022), 496–507 , arXiv: 2210.15420
3.
N. I. Aleksandrova, “The propagation of transient waves in two-dimensional square lattices”, International Journal of Solids and Structures, 234–235 (2022), 111194 , 18 pp., arXiv: 2201.12281
N. I. Aleksandrova, “Three-dimensional modeling of pendulum waves propagation under dynamic loading of underground excavation surface”, Geodynamics and Stress State of the Earth's Interior (Novosibirsk, 30 September – 04 October 2019), IOP Conference Series: Earth and Environmental Science, 773, IOP Publishing Ltd, 2021, 012004
5.
N. I. Aleksandrova, A. S. Kondratenko, “Movement of an open-ended pipe with a soil plug under a longitudinal impact”, Geotechnical and Geological Engineering, 38:4 (2020), 3493–3504
K. X. Wang, N. I. Aleksandrova, Y. S. Pan, V. N. Oparin, L. M. Dou, A. I. Chanyshev, “Effect of block medium parameters on energy dissipation”, Journal of Applied Mechanics and Technical Physics, 60:6 (2019), 926–934 , arXiv: 2101.11960
7.
N. A. Aleksandrova, A. S. Kondratenko, “Calculation of pipe movement with soil plug under longitudinal impact”, Note that the publisher printed the initials of the first author as "N. A." instead of "N. I.", Journal of Mining Science, 54:3 (2018), 384–396
8.
N. I. Aleksandrova, “Pendulum waves on the surface of block rock mass under dynamic impact”, Journal of Mining Science, 53:1 (2017), 59–64 , arXiv: 1811.04382
9.
N. I. Aleksandrova, “Influence of soil plug on pipe ramming process”, Journal of Mining Science, 53:6 (2017), 1073–1084 , arXiv: 1811.03913
10.
N. I. Aleksandrova, “Propagation of pendulum waves under deep-seated cord charge blasting in blocky rock mass”, Journal of Mining Science, 53:5 (2017), 824–830 , arXiv: 1811.03900
11.
N. I. Aleksandrova, “A model of dynamic loading of a cavity in a three-dimensional block medium (in Russian)”, Physical Mesomechanics, 20:2 (2017), 79–89
12.
N. I. Aleksandrova, “Seismic waves in a three-dimensional block medium”, Proceedings of the Royal Society of London. A. Mathematical, Physical and Engineering Sciences, 472:2192 (2016), 20160111 , 16 pp., arXiv: 1610.01483
N. I. Alexandrova, “The plane Lamb problem for a 2D discrete medium”, Doklady Physics, 60:1 (2015), 5–10
14.
N. I. Aleksandrova, The study of transient wave processes in block and elastic media taking into account viscosity and external dry friction, ‘Doctor of Science’ degree in Solid Mechanics (corresponds to habilitation in Mechanics), N.A. Chinakal Institute of Mining of the Siberian Division of the Russian Academy of Sciences, Novosibirsk, Russia, 2015 , 276 pp.
15.
N. I. Aleksandrova, “The discrete Lamb problem: Elastic lattice waves in a block medium”, Wave motion, 51:5 (2014), 818–832 , arXiv: 1404.2437
N. I. Aleksandrova, “Asymptotic formulae for the Lommel and Bessel functions and their derivatives”, Royal Society Open Science, 1 (2014), 140176 , 16 pp., arXiv: 1410.4102
N. I. Aleksandrova, “Asymptotic solution of the anti-plane problem for a two-dimensional lattice”, Doklady Physics, 59:3 (2014), 129–132 , arXiv: 1404.2437
18.
N. I. Aleksandrova, “Numerical-analytical investigation into impact pipe driving in soil with dry friction. Part II: Deformable external medium”, Journal of Mining Science, 49:3 (2013), 413–425 , arXiv: 1312.1582
19.
N. I. Aleksandrova, “Numerical-analytical investigation into impact pipe driving in soil with dry friction. Part I: Nondeformable external medium”, Journal of Mining Science, 48:5 (2012), 856–869 , arXiv: 1312.1575
20.
N. I. Aleksandrova, Lectures on the topic “Pendulum waves” in the framework of the course “Nonlinear Geomechanics” (in Russian), eds. E. N. Sher, Mining Institute of the Siberian Branch of the Russian Academy of Sciences, Novosibirsk, 2012 , 72 pp.
21.
N. I. Aleksandrova, “On the asymptotics of integrals arising in the study of the wave motion in lattices”, Proceedings of the conference on metric geometry of surfaces and polyhedra, dedicated to the 100th anniversary of N. V. Efimov (Moscow, Russia, August 18–21, 2010), ISBN: 978-5-211-05652-7, Contemporary Problems of Mathematics and Mechanics, 6, no. 2, eds. I. Kh. Sabitov, V. N. Chubarikov, Moscow State University, Moscow, 2011, 86–89arxiv.org/pdf/2009.01662v2.pdf
22.
N. I. Aleksandrova, E. N. Sher, “Wave propagation in the 2D periodical model of a block-structured medium. Part I: characteristics of waves under impulsive impact”, Journal of Mining Science, 46:6 (2010), 639–649
23.
N. I. Aleksandrova, M. V. Ayzenberg-Stepanenko, E. N. Sher, “Modelling the elastic wave propagation in a block medium under the impulse load”, Journal of Mining Science, 45:5 (2009), 427–437
24.
Victor Alexandrov, Nadezhda Alexandrova, Gunter Weiss, Simplices with equiareal faces, 2009 (Published online) , 6 pp., arXiv: 0909.1859
25.
N. I. Aleksandrova, E. N. Sher, A. G. Chernikov, “Effect of viscosity of partings in block-hierarchical on propagation of low-frequency pendulum waves”, Journal of Mining Science, 44:3 (2008), 225–234
26.
N. I. Aleksandrova, Seminars on linear algebra and differential geometry (in Russian), Textbook for first-year students of the Faculty of Physics of Novosibirsk State University, Novosibirsk State University, Novosibirsk, 2008 , 44 pp. e-lib.nsu.ru/dsweb/Get/Resource-8454/page00000.pdf
27.
E. N. Sher, N. I. Aleksandrova, “Effect of borehole charge structure on the parameters of a failure zone in rocks under blasting”, Journal of Mining Science, 43:4 (2007), 409–417
28.
E. N. Sher, N. I. Aleksandrova, M. V. Ayzenberg-Stepanenko, A. G. Chernikov, “Influence of the block-hierarchical structure of rocks on the peculiarities of seismic wave propagation”, Journal of Mining Science, 43:6 (2007), 585–591
29.
N. I. Aleksandrova, Seminars on higher algebra and analytical geometry (in Russian), Textbook for first-year students of the Faculty of Physics of Novosibirsk State University, Novosibirsk State University, Novosibirsk, 2007 , 88 pp. e-lib.nsu.ru/dsweb/Get/Resource-8727/page00000.pdf
30.
N. I. Aleksandrova, A. G. Chernikov, “On the attenuation of one-dimensional waves in a block medium with visco-elastic interlayers”, Dinamika Sploshnoi Sredy, 125, Lavrent’ev Institute of Hydrodynamics, Novosibirsk, Russia, 2007, 5-10
31.
N. I. Aleksandrova, E. N. Sher, “Modeling the failure of rock blocks by blasting a cylindrical charge”, Journal of Mining Science, 42:1 (2006), 27–34
32.
N. I. Aleksandrova, A. G. Chernikov, E. N. Sher, “On attenuation of pendulum-type waves in a block rock mass”, Journal of Mining Science, 42:5 (2006), 468–475
33.
N. I. Aleksandrova, A. G. Chernikov, E. N. Sher, “Experimental investigation into the one-dimensional calculated model of wave propagation in block medium”, Journal of Mining Science, 41:3 (2005), 232–239
34.
N. I. Aleksandrova, E. N. Sher, “Modeling of wave propagation in block media”, Journal of Mining Science, 40:6 (2004), 579–587
35.
N. I. Aleksandrova, “Elastic wave propagation in block medium under impulse loading”, Journal of Mining Science, 39:6 (2003), 556–564
36.
S. V. Serdyukov, E. N. Sher, N. I. Aleksandrova, “Calculation of fluid flow in the oil well under the action of powder gas generator”, Journal of Mining Science, 38:4 (2002), 344–351
37.
E. N. Sher, N. I. Aleksandrova, “Crack development under pulse hydraulic fracturing of rocks”, Journal of Mining Science, 38:6 (2002), 573–578
38.
Ye. N. Sher, N. I. Aleksandrova, “Dynamics of microfailures in elastic zone during explosion of spherical charge in rock”, Journal of Mining Science, 36:5 (2001), 475–481
39.
N. I. Aleksandrova, Ye. N. Sher, “Influence exerted by gas leakages from the explosion cavity for a spherical charge on rock breaking”, Journal of Mining Science, 36:5 (2000), 452–461
40.
N. I. Aleksandrova, Ye. N. Sher, “Dynamics of breaking zone development during explosion of a concentrated charge in a brittle medium”, Journal of Mining Science, 36:5 (2000), 462–475
41.
N. I. Aleksandrova, Ye. N. Sher, “Effect of dilation on rock breaking by explosion of a cylindrical charge”, Journal of Mining Science, 35:4 (1999), 400–408
42.
N. I. Aleksandrova, Ye. N. Sher, “Effect of stemming on rock breaking with explosion of a cylindrical charge”, Journal of Mining Science, 35:5 (1999), 483–493
43.
E. N. Sher, N. I. Aleksandrova, A. S. Serdechny, “Transmission of impact impulse to an instrument through a liquid layer in impact machines”, Journal of Mining Science, 34:6 (1998), 498–502
44.
E. N. Sher, N. I. Aleksandrova, “Taking sample dynamics into account in tests on a Hopkinson composite rod”, Journal of Mining Science, 34:4 (1998), 367–374
45.
E. N. Sher, N. I. Aleksandrova, “Dynamics of development of crushing zone in elastoplastic medium in camouflet explosion of string charge”, Journal of Mining Science, 33:6 (1997), 529–535
46.
N. I. Aleksandrova, “Resonance wave processes in a system of coaxial shells with fluid”, Proceedings of the 2nd conference “Numerical modelling in continuum mechanics” (August 22–25, 1994, Prague), Prague (Czech Republic), 1995, 1–-9
47.
N. I. Aleksandrova, “Nonstationary diffraction of elastic waves on a rigid elliptical cylinder”, Journal of Applied Mechanics and Technical Physics, 36:5 (1995), 747–755
48.
N. I. Aleksandrova, “Nonstationary diffraction of elastic waves on a rigid elliptical cylinder”, J. Appl. Mech. Tech. Phys., 36:5 (1995), 747–755
49.
N. I. Aleksandrova, I. V. Efimova, “Effect of a plane acoustic pressure wave on a reinforced cylindrical shell”, Journal of Applied Mechanics and Technical Physics, 33:5 (1992), 717–722
50.
N. I. Aleksandrova, I. V. Efimova, “Effect of a plane acoustic pressure wave on a reinforced cylindrical shell”, J. Appl. Mech. Tech. Phys., 33:5 (1992), 717–722
51.
N. I. Alexandrova, “Approximation of boundary conditions for the hydroelastic problems”, Matem. Mod., 3:12 (1991), 16–30
52.
N. I. Aleksandrova, “Diffraction of a longitudinal wave by a rigid elliptical cylinder”, Soviet Physics. Doklady, 36:6 (1991), 488–489
53.
S. A. Abdukadyrov, N. I. Aleksandrova, M. V. Stepanenko, “Izgibnye pezonancnye volny v tsilindpicheskoi obolochke ppi dvizhuscheisya padialnoi nagpuzke”, Izvestiya AH SSSR. Mekhanika tverdogo tela, 1989, no. 5, 132–137
54.
N. I. Aleksandrova, I. A. Potashnikov, M. V. Stepanenko, “Resonance bending waves in a cylindrical shell under a moving radial load”, Journal of Applied Mechanics and Technical Physics, 30:3 (1989), 465–470
55.
N. I. Aleksandrova, I. A. Potashnikov, M. V. Stepanenko, “Resonance bending waves in a cylindrical shell under a moving radial load”, J. Appl. Mech. Tech. Phys., 30:3 (1989), 465–470
56.
N. I. Pinchukova, “Deistvie sfepicheskoi akusticheskoi volny davleniya na uppuguyu tsilindpicheskuyu obolochku, zapolnennuyu zhidkostyu”, Ppikladnaya mekhanika, 23:8 (1987), 43–49
57.
A. I. Belov, V. A. Kornilo, N. I. Pinchukova, M. V. Stepanenko, “Reaction of a three-layer hydroelastic cylindrical shell to an axisymmetric internal explosion”, Journal of Applied Mechanics and Technical Physics, 27:1 (1986), 139–145
58.
N. I. Pinchukova, “Hestatsionapnaya difpaktsiya uppugoi volny na zhestkom tsilindpe”, Fiziko-tekhnicheskie problemy razrabotki poleznykh iskopaemykh, 1986, no. 3, 81–84
59.
N. I. Pinchukova, “Effect of a spherical acoustic pressure wave on a fluid-filled elastic cylindrical shell”, Soviet Applied Mechanics, 23:8 (1987), 740–745
60.
S. A. Abdukadyrov, N. I. Pinchukova, M. V. Stepanenko, “A method for numerical solution of the dynamics equations of elastic media and structures”, Soviet Mining, 20:6 (1984), 449–455
61.
N. I. Pinchukova, “Axisymmetric reaction of a cylindrical casing to the effect of a hydroimpact”, Soviet Mining, 17:4 (1981), 313–323
62.
N. I. Pinchukova, M. V. Stepanenko, “Low-frequency resonance waves in a cylindrical shell with coupled masses”, Soviet Mining, 15:4 (1979), 339–346
63.
N. I. Pinchukova, M. V. Stepanenko, “Propagation of traveling waves in a cylindrical elastic system with coupled masses”, Soviet Mining, 14:4 (1978), 355–361
64.
N. Alexandrova, “Problem 11462”, The American Mathematical Monthly, 116:9 (2009), 844 (For a solution see Amer. Math. Monthly, 118, no. 5, 468-469 (2011). DOI: 10.4169/amer.math.monthly.118.05.463)
65.
N. I. Alexandrova, “Problem E3357”, The American Mathematical Monthly, 96:10 (1989), 927 (This problem is published in the Section “Problems and solutions”. Its solution is published in Amer. Math. Monthly, 98:5 (1991), 440–441; see DOI:10.1080/00029890.1989.11972308)