Mechanics of Solids (about journal) Mechanics of Solids
A Journal of Russian Academy of Sciences
 Founded
in January 1966
Issued 6 times a year
Print ISSN 0025-6544
Online ISSN 1934-7936

Russian Russian English English About Journal | Issues | Guidelines | Editorial Board | Contact Us
 


IssuesArchive of Issues2007-5pp.807-822

Archive of Issues

Total articles in the database: 12854
In Russian (Èçâ. ÐÀÍ. ÌÒÒ): 8044
In English (Mech. Solids): 4810

<< Previous article | Volume 42, Issue 5 / 2007 | Next article >>
E. L. Aero and A. N. Bulygin, "Strongly nonlinear theory of nanostructure formation owing to elastic and nonelastic strains in crystalline solids," Mech. Solids. 42 (5), 807-822 (2007)
Year 2007 Volume 42 Number 5 Pages 807-822
Title Strongly nonlinear theory of nanostructure formation owing to elastic and nonelastic strains in crystalline solids
Author(s) E. L. Aero (Institute for Problems in Mechanical Engineering, Russian Academy of Sciences, Bol’shoy pr-t 61, St. Petersburg, 199178, Russia, aero@microm.ipme.ru)
A. N. Bulygin (Institute for Problems in Mechanical Engineering, Russian Academy of Sciences, Bol’shoy pr-t 61, St. Petersburg, 199178, Russia)
Abstract We develop an essentially nonlinear theory of elastic and nonelastic microstrains resulting in the formation of nanostructures. Using the model of mutually penetrating lattices, we generalize the well-known theory of acoustic and optical vibrations to the case of nonlinear interaction between sublattices. This permits treating the sublattice interaction forces as periodic (for example, sinusoidal) functions of the relative displacement of the sublattices. We obtain equations for the macroscopic and microscopic displacement fields containing two characteristic scales of the nanostructure. We find a number of their solutions describing the effects of decrease in the potential interatomic barriers in the external stress field and the formation of defects and domain nanostructure as a result of bifurcation transitions. We prove their stability.
References
1.  M. Born and Huang Kun, Dynamic Theory of Crystal Lattices (Inostr. Lit., Moscow, 1958) [in Russian].
2.  A. M. Kosevich, Crystal Lattice Theory (Vishcha Shkola, Khar'kov, 1988) [in Russian].
3.  I. A. Kunin, Theory of Elastic Media with Microstructure (Nauka, Moscow, 1975) [in Russian].
4.  E. L. Aero, "Strongly Nonlinear Theory of Elastic and Nonelastic Strains in Crystal Bodies," in Mathematical Modeling of Systems and Processes (Izd-vo Perm Tekhn. Univ., Perm, 2006), pp. 27-55 [in Russian].
5.  E. L. Aero, "Micromechanics of a Double Continuum in a Model of a Medium with Variable Periodic Structure," J. Eng. Math. 1, 1-15 (2005).
6.  V. S. Boiko, R. I. Garber, and A. M. Kosevich, Reversible Plasticity in Crystals (Nauka, Moscow, 1991) [in Russian].
7.  P. Hirth and J. Lothe, Theory of Dislocations (McGraw-Hill, New York, 1968; Atomizdat, Moscow, 1972).
Link to Fulltext
<< Previous article | Volume 42, Issue 5 / 2007 | Next article >>
Orphus SystemIf you find a misprint on a webpage, please help us correct it promptly - just highlight and press Ctrl+Enter

101 Vernadsky Avenue, Bldg 1, Room 246, 119526 Moscow, Russia (+7 495) 434-3538 mechsol@ipmnet.ru https://mtt.ipmnet.ru
Founders: Russian Academy of Sciences, Ishlinsky Institute for Problems in Mechanics RAS
© Mechanics of Solids
webmaster
Rambler's Top100