Issue 38

N. Vaysfeld et alii, Frattura ed Integrità Strutturale, 38 (2016) 1-11; DOI: 10.3221/IGF-ESIS.38.01 11 [4] Koiter, W., Alblas, J., On the bending of cantilever rectangular Plates, Proc. Koninke Nederl. Acad. wet. B., 57(2) (1954). [5] Aglovyan, L. A., Gevorkyan, R. S., About some mixed problems of elasticity theory for the semi-strip (in Russian), News of academy of science Armenian SSR, Mechanics, 23(3) (1970) 3-13. [6] Trapeznikov, L. P., Influence lines for the normal tensions in semi-strip (in Russian), News of USSR n.-i. of the hydromechanical institute, 73 (1963). [7] Kolchin, G. B., Plyat, Sh. N., Sheykner, N. Ya., Some problems of the themoelasticity for the rectangular areas (in Russian), Shtiica, (1980). [8] Suchevan, V. G., The tensioned state of the elastic semi-strip with fixed edges (in Russian), Matematiceskie issledovaniya, 40 (1976) 122-135. [9] Thecaris, P. The stress distribution in a semi-infinite strip subjected to a concentrated load, Trans. J. Appl. Mech., 26(3) (1959) 401–406. [10] Johnson, M. W., Little, R. W., The semi-infinite elastic strip, Q. Appl. Math., 22(4) (1965) 335-344. [11] Horvay, G., The end problem of rectangular strips, J. Appl. Mech., 20 (1953) 87-94. [12] Horvay, G., Born, J., Some mixed boundary-value problems of the semi-infinite strip, Journal of Applied Mechanics, 24(2) (1957) 261-268. [13] Benthem, J.P., A Laplace transform method for the solution of semi-infinite and finite strip problems in stress analiesis, Quart. J. Mech. and Appl. Math., 16(4) (1963) 413-429. [14] Gogoleva, O. S., The examples of solutions of the first main boundary problem of elasticity theory in the semi-strip (symmetrical problem) (in Russian), Journal Omskiy gosudarstvenniy universitet, 145(9) (2012) 138-142. [15] Kovalenko, M. D., Shulyakovskaya, T. D., Expansion of Fadle-Papkovich functions in the strip. Bases of theory (in Russian), Mechanica tverdogo tela, 5 (2011) 78-98. [16] Menshova, I. V., Lapikova, E. S., The semi-strip with lateral edges rigidity, working for tension-compression (in Russian), Journal ChGPU named I. Ya. Yakovlev, series: Mechanic of the limited state, 20(2) (2014) 106-118. [17] Popov, G. Ya., About new transformations of the elasticity resolving equations and the new integral transformations with their application to the boundary problems of mechanics, Intern Appl. Mech., 39 (2003) 1046-1071. [18] Vaysfel’d, N. D., Zhuravlova, Z. Yu., On one new approach to the solving of an elasticity mixed problem for the semi-strip, Acta Mechanica, 226(12) (2015) 4159-4172, DOI: 10.1007/ s00707-015-1452 -x. [19] Ciavarella, M., Paggi, M., Carpinteri, A., One, no one, and one hundred thousand crack propagation laws: a generalized Barenblatt and Botvina dimensional analysis approach to fatigue crack growth, Journal of the Mechanics and Physics of Solids, 56(12) (2008) 3416-3432. [20] Carpinteri, A., Paggi, M., Analytical study of the singularities arising at multi-material interfaces in 2D linear elastic problems, Engineering fracture mechanics, 74(1) (2007) 59-74. [21] Duduchava, R. V., Integral convolution equations with discontinuous presymbols, singular integral equations with fixed singularity and their application to the mechanical problems (in Russian), Tbilisi, Mecniereba, (1979). [22] Kryvyy, O. F., Tunnel Internal Crack in a Piecewise Homogeneous Anisotropic Space, Journ. of Mathematical Sciences, 198(1) (2014) 62-74. [23] Kryvyi, O. F., Mutual influence of an interface tunnel crack and an interface tunnel inclusion in a piecewise homogeneous anisotropic space, Journ. of Mathematical Sciences, 208(4) (2015) 409-416. [24] Popov, G.Ya ., The elastic stress' concentration around dies, cuts, thin inclusions and reinforcements (in Russian), Nauka, Moskow (1982). [25] Uflyand, Ya. S., Integral transformations in the problems of the elasticity theory (in Russian), Nauka, L., (1967).