The integral representation of fractionally exponential functions and their application to dynamic problems of linear visco-elasticity

A version of boundary integral equations of the first kind in dynamic problems of the theory of elasticity is proposed, based on an investigation of the analytic properties of the Fourier transformant of the displacement vector, rather than on fundamental solutions. A system of three boundary integr

Line-integral representations for the solution of the elastostatic traction boundary-value problem of the hail space are derived for the case of polyharmonic surface loading. For load regions of essentially arbitrary shape, bearing uniform tractions, these line-integral representations are applied t

An elastic bounded anisotropic solid with an elastic inclusion is considered. An oscillating source acts on part of the boundary of the sofid and excites oscillations in it. Zero displacements are specified on the other part of the solid and zero forces on the remaining part. A variation in the shap

Elastic fields of circular dislocation and disclination loops are represented in explicit form in terms of spherical harmonics, i.e. via series with Legendre and associated Legendre polynomials. Representations are obtained by expanding Lipschitz-Hankel integrals with two Bessel functions into Legen