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IssuesArchive of Issues2018-6pp.664-674

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A.I. Zhornik and V.A. Kirichek, "Crack Propagation under the Pulsed Loads," Mech. Solids. 53 (6), 664-674 (2018)
Year 2018 Volume 53 Number 6 Pages 664-674
DOI 10.3103/S0025654418060079
Title Crack Propagation under the Pulsed Loads
Author(s) A.I. Zhornik (Chekhov Taganrog Institute (Branch) of the Rostov State Economic University Initsiativnaya ul. 48, Taganrog, 347936 Russia, Zhornik_Victoria@mail.ru)
V.A. Kirichek (Chekhov Taganrog Institute (Branch) of the Rostov State Economic University Initsiativnaya ul. 48, Taganrog, 347936 Russia)
Abstract The article deals with the dynamic 2D problem of the theory of elasticity that considers a massive body with a semi-infinite plane crack, the faces of which are subjected to a normal pulsed tensile load symmetric to the crack. When studying the stress state ahead of the crack tip, the singular and regular terms have been found. They have been used to find the pre-fracture (incubation) period under the threshold loads. It has been shown that the regular term taking into account significantly affects the stress state, in particular, the incubation period. In the case of shock impulses above the threshold (overloads), the period of the crack tip movement with a variable speed ("breakthrough" of a crack) is considered as well as the pre-fracture period. To this end, the structural-time criterion for determining the incubation period is generalized to the case of the crack movement with a variable speed. A comparison of the calculated values of increasing the length of cracks after fracture caused by three shock impulses above the threshold with experimental data is made.
Keywords dynamic fraction, pulsed load, incubation period, stress intensity factor, crack propagation
References
1.  T.F. Kalthoff and D.A. Shockey, "Instability of Cracks Under Impulse Loads," J. Appl. Phys. 48, 986-993 (1977).
2.  N.F. Morozov and Yu.V. Petrov, Dynamics of Fracture (Izdat. SPbGU, St.Petersburg, 1997; Springer, Berlin, Heidelberg, New York, 2000).
3.  S.I. Krivosheev, N.F. Morozov, Yu.V. Petrov, and G.A. Shneerson, "Initiation of the Fracture of Solids under Intense Pulsed Loading," Izv. Ross. Akad. Nauk, Mekh. Tv. Tela, No. 5, 165-171 (1999).
4.  A.A. Grudzkov, S.I. Krivosheev, and Yu.V. Petrov, "The Fracture Energy of Materials under Pulse Microsecond-Scale Loading," Fiz. Tv. Tela 45 (5), 842-845 (2003). [Phys. Sol. State (Eng. Transl.) 45 (5), 886-889 (2003)].
5.  L.B. Freund, "Crack Propagation in an Elastic Solid Subjected to General Loading - II. Non Uniform Rate of Extension," J. Mech. Phys. Solids 20, 14-152 (1972).
6.  L.B. Freund, "Crack Propagation in an Elastic Solid Subjected to General Loading - III. Stress Wave Loading," J. Mech. Phys. Solids. 21, 47-61 (1973).
7.  A.I. Zhornik and E.M. Kartashov, "On the Dynamic Elastic Problem of a Space with a Moving Semi-Infinite Crack," Prikl. Mekh. 2 (12), 56-63 (1992).
8.  L.B. Freund, "The Stress Intensity Factor due to Normal Impact Loading of the Faces of a Crack," Int. J. Engng Sci. 12 (2), 179-189 (1974).
9.  V. Bratov, Y. Petrov, and A. Utkin, "Transient Near Tip Fields in Crack Dynamics," Sci. China Phys. Mech. Astr. 54 (7), 1309-1318 (2011).
10.  L.B. Freund, "Crack Propagation in an Elastic Solid Loading. 1. Constant Rate of Extension," J. Mech. Phys. Solids 20, 129-140 (1972).
11.  W. Dõll, %o-umlaut& "Application of an Energy Balance and an Energy Method to Dynamic Crack Ropagation," Int. J. Fract. 12 (4), 595-605 (1976).
12.  I. Narisava, Strength of Polymer Materials (Khimiya, Moscow, 1987) [in Russian].
13.  W.G. Knauss, "Fundamental Problems in Dynamic Fracture," Adv. Fract. Res. 1, 625-651 (1984).
14.  W. Nowacki, Theory of Elasticity (PWN, Warsaw, 1970; Mir, Moscow, 1975).
15.  V.I. Smirnov, Course of Higher Mathematics Vol. 2 (Nauka, Moscow, 1974) [in Russian].
Received 10 December 2016
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