[1. Berezhnitskii L.T., Panasyuk V.V. , Stashchuk N.G. (1983), The Interaction of Rigid Linear Inclusions and Cracks in a Deformable Body (in Russian), Naukova Dumka, Kiev.]Search in Google Scholar
[2. Chaudhuri R.A. (2003), Three-dimensional asymptotic stress field in the vicinity of the circumference of a penny-shaped discontinuity, International Journal of Solids and Structures, Vol. 40, 3787-3805.]Search in Google Scholar
[3. Chaudhuri R.A. (2012), On three-dimensional singular stress field at the front of a planar rigid inclusion (anticrack) in an orthorhombic mono-crystalline plate, International Journal of Fracture, Vol. 174, 103-126.]Search in Google Scholar
[4. Ding H., Chen W., Zhang L. (2006), Elasticity of Transversely Isotropic Materials, Solid Mechanics and its Applications, Vol. 126, Springer, The Netherlands.]Search in Google Scholar
[5. Erdelyi A. (1954), Tables of Integral Transforms, Vol.1, McGraw-Hill, New York.]Search in Google Scholar
[6. Fabrikant V.I. (1989), Applications of Potential Theory in Mechanics: A Selection of New Results, Kluwer Academic Publishers, Dordrecht.]Search in Google Scholar
[7. Fabrikant V.I. (1991), Mixed Boundary Value Problems of Potential Theory and their Applications, Kluwer Academic Publishers, Dordrecht.]Search in Google Scholar
[8. Kaczyński A. (1993),On the three-dimensional interface crack problems in periodic two-layered composites, International Journal of Fracture, Vol. 62, 283-306.]Search in Google Scholar
[9. Kaczyński A. (1999), Rigid sheet-like interface inclusion in an infinite bimaterial periodically layered composite, Journal of Theoretical and Applied Mechanics, Vol. 37, 81-94.]Search in Google Scholar
[10. Kanaun S.K., Levin V.M. (2008), Self-Consistent Methods for Composites. Vol. 1: Static Problems, Solid Mechanics and its Applications, Vol. 148, Springer,The Netherlands, Dordrecht.10.1007/978-1-4020-6664-1]Search in Google Scholar
[11. Kassir M.K., Sih G.C. (1968), Some three-dimensional inclusion problems in elasticity, International Journal of Solids and Structures, Vol. 4, 225-241.]Search in Google Scholar
[12. Kassir M.K., Sih G.C. (1975), Three-Dimensional Crack Problems, Mechanics of Fracture 2, Noordhoof Int. Publ., Leyden.]Search in Google Scholar
[13. Khai M.V. (1993), Two-Dimensional Integral Equations of the Newton-Potential Type and their Applications (in Russian), Naukova Dumka, Kiev.]Search in Google Scholar
[14. Kit G.S., Khai M.V. (1989), Method of Potentials in Three- Dimensional Problems of Thermoelasticity of Bodies with Cracks (in Russian), Naukova Dumka, Kiev.]Search in Google Scholar
[15. Mura T. (1982), Micromechanics of Defects in Solids, Martinus Nijhoff, The Hague.10.1007/978-94-011-9306-1]Search in Google Scholar
[16. Panasyuk V.V., Stadnik M.M., Silovanyuk V.P. (1986), Stress Concentrations in Three-Dimensional Bodies with Thin Inclusions (in Russian), Naukova Dumka, Kiev.]Search in Google Scholar
[17. Podil’chuk Y.N. (1997), Stress state of a transversely-isotropic body with elliptical inclusion, International Applied Mechanics, Vol. 33, 881-887.]Search in Google Scholar
[18. Rahman M. (1999), Some problems of a rigid elliptical disc-inclusion bonded inside a transversely isotropic space, Transactions of the ASME Journal of Applied Mechanics, Vol. 66, 612-630.]Search in Google Scholar
[19. Rahman M. (2002), A rigid elliptical disc-inclusion, in an elastic solid, subjected to a polynomial normal shift, Journal of Elasticity, Vol. 66, 207-235.]Search in Google Scholar
[20. Rogowski B. (2006), Inclusion Problems for Anisotropic Media, Technical University of Lodz, Lodz.]Search in Google Scholar
[21. Selvadurai A.P.S. (1982),On the interaction between an elastically embedded rigid inhomogeneity and a laterally placed concentrated force, Journal of Applied Mathematics and Physics (ZAMP), Vol. 33, 241-250.]Search in Google Scholar
[22. Shodja H.M., Ojaghnezhad F. (2007), A general unified treatment of lamellar inhomogeneities, Engineering Fracture Mechanics, Vol. 74, 1499-1510.]Search in Google Scholar
[23. Silovanyuk V.P. (1984), A rigid lamellar inclusion in elastic space, Materials Science, Vol. 20, 482-485.]Search in Google Scholar
[24. Silovanyuk V.P. (2000), Fracture of Prestressed and Transversely Isotropic Bodies with Defects, National Academy of Science of Ukraine, Physico-Mechanical Institute named G.V. Karpenko, Lviv.]Search in Google Scholar
[25. Sneddon I.N. (1972), The Use of Integral Transforms, McGraw-Hill, New York.]Search in Google Scholar
[26. Ting T.C.T. (1996), Anisotropic Elasticity: Theory and Applications, Oxford University Press, New York.10.1093/oso/9780195074475.001.0001]Search in Google Scholar
[27. Vorovich I.I., Alexandrov V. V., Babeshko V. A. (1974), Nonclassical Mixed Boundary Problems of Theory of Elasticity (in Russian), Nauka, Moscow. ]Search in Google Scholar