Elastic response of transversely isotropic and non-homogeneous geomaterials under circular ring concentrated and axisymmetric distributed loads

Abstract

<p>This paper first develops the closed-form solution of a layered halfspace subject to circular ring concentrated loads. The layered halfspace consists of finite layers and a lower halfspace. All the layers in the layered halfspace are homogeneous and transversely isotropic. Integral transform techniques are utilized to derive the solution in cylindrical polar coordinates. Then, the closed-form solution is used to develop the <a href="https://www.sciencedirect.com/topics/engineering/numerical-methods" title="Learn more about numerical method from ScienceDirect's AI-generated Topic Pages">numerical method</a> of <a href="https://www.sciencedirect.com/topics/engineering/axisymmetric" title="Learn more about axisymmetric from ScienceDirect's AI-generated Topic Pages">axisymmetric</a> distributed loads over circular areas. The <a href="https://www.sciencedirect.com/topics/mathematics/numerical-methods" title="Learn more about numerical method from ScienceDirect's AI-generated Topic Pages">numerical method</a> involves integration along the radius direction and <a href="https://www.sciencedirect.com/topics/computer-science/discretization" title="Learn more about discretization from ScienceDirect's AI-generated Topic Pages">discretization</a> of a loading circular area into one-dimensional elements. Finally, the <a href="https://www.sciencedirect.com/topics/engineering/elastic-response" title="Learn more about elastic responses from ScienceDirect's AI-generated Topic Pages">elastic responses</a> of non-homogeneous geomaterial halfspaces under <a href="https://www.sciencedirect.com/topics/engineering/axisymmetric" title="Learn more about axisymmetric from ScienceDirect's AI-generated Topic Pages">axisymmetric</a> distributed loads over circular areas are analyzed in detail</p>