A numerical technique for the boundary element method analysis of steady-state harmonic oscillations of elastic massive structural elements is developed. The technique takes into account the random nature of the physicomechanical parameters of the material. The deviations of random variables from their average values are considered as a small parameters. The decomposition of unknown densities and kernels of integral equations into a power series by these small parameters is performed. A system of boundary integral equations was obtained using the procedure of the perturbation method. The successive solving of the mentioned equations allows to determine the statistical characteristics of the unknown quantities. Expressions for the derivatives of the fundamental solution of the problem with respect to a small parameter which are the kernels of integral equations are given. A set of approximate expressions was obtained by expanding the fundamental solutions and their derivatives into Maclaurin series in terms of the distance from integration pole parameter. The singularities of the proposed representations coincide with the singularities of the corresponding kernels of the statics problem so they can be used for calculating the integrals over boundary elements containing an integration pole. A comparison of the obtained approximate expressions with their exact analogues is carried out. The number of members of the truncated series which is necessary for a satisfactory representation of the kernels of integral equations in a wide frequency range has been determined.