Nombre S. Space vibrations and waves in a anisotropic bodies with flexible non-tensility covers of face

The dissertation is devoted to the theoretical numerical-analytical investigation of process of propagation and scattering of normal elastic waves in a tree-dimensional rectilinear-anisotropical piezoelectric or non-piezoelectric bodies in form of layer and right-angle prism with flexible non-tensility covers of faces. The basis results is construction of dispersion solutions, investigation of full spectrum of normal waves, construction of methodics investigation of excitation, indirection and refraction normal waves in prismatic bodies on the basis of series in the set of normal waves. Dynamic edges effects in this bodies are investigated. The theory of dynamic homogeneous solutions for problems of vibrations one-connected rectilinear-orthotropic plates with flexible non-tensility covers of faces are constructed. On the basis of methods dynamic homogeneous solutions investigated free vibrations rectilinear-orthotropic disk-type plates and prismatic finite bodies.