|
Elastic Layer on the Elastic Half-Space: The Solution in MatrixesDOI: 10.4236/oalib.1107191, PP. 1-6 Subject Areas: Integral Equation Keywords: Bidimensional Fourier’s Transformation Abstract If to apply bidimensional Fourier’s transform to homogeneous system of equations of the theory of elasticity, then we will receive system of ordinary differential equations. The general solution of this system contains 6 arbitrary constants and allows to solve problems for the layer and the multilayer environment. It is shown that it is convenient to do statement and the solution of such tasks in the matrix form. The task for the layer on the elastic half-space is solved. Ways of inverse of Fourier’s transformation are considered. Dobrovolsky, I. P. (2021). Elastic Layer on the Elastic Half-Space: The Solution in Matrixes. Open Access Library Journal, 8, e7191. doi: http://dx.doi.org/10.4236/oalib.1107191. References
comments powered by Disqus |