DETERMINATION OF THE NATURAL MODES OF A COMPLEX ELASTIC SYSTEM IN TERMS OF THE NATURAL MODES OF THE UNCONSTRAINED COMPONENTS

Abramowitz, Jay Stuart, 1940-

January 1971

No description available.

Elastic waves -- Mathematical models.

Mathematical aspects of wave theory for inhomogeneous materials / by Ashley Ian Larsson

Larsson, Ashley Ian

January 1991

Bibliography: leaves 135-151 / v, 151 leaves : ill ; 30 cm. / Title page, contents and abstract only. The complete thesis in print form is available from the University Library. / Thesis (Ph.D.)--University of Adelaide, Dept. of Applied Mathematics, 1991

Inhomogeneous materials.

Elastic waves Mathematical models.

Wave motion, theory of.

Analysis of wave motion in irregular layered media using a finite-element perturbation method

Ikeda Junior, Isamu, 1969-

21 September 2012

A technique that allows for nonparallel interfaces and lateral inhomogeneities in an irregular layered medium is described. The formulation combines a semidiscrete finite-element technique with a perturbation method, providing an approximate treatment of wave propagation in irregular layered media. The procedure treats the irregularities as perturbations with respect to a reference, horizontally-layered, laterally-homogeneous medium and produces approximations of the perturbed wave motion with little additional computation effort. Within the framework of the method, consistent transmitting boundaries and other semidiscrete hyperelements as well as Green’s functions, already available for regular layered media, can be reformulated. The method is relevant in problems of foundation dynamics, ground response to seismic waves and site characterization. Example problems are presented toward evaluation of the effectiveness of the method. / text

Elastic waves--Mathematical models

Wave-motion, Theory of|xMathematics