Non-stationary boundary equations for plates with transverse shear deformation and elastic articulation of the boundary

## Communicated by G. F. Roach The method of matched asymptotic expansions is used to find a homogenized problem whose solution is an approximation to the solution of a mixed periodic boundary value problem in the theory of bending of thin elastic plates. A critical size for the fixed parts of the

An approximate method is presented for dealing with transverse vibrations of cirRular plates of variable thickness in the case of supports having rotational flexibility which varies in an arbitrary manner around the boundary. It is also assumed that the plate is subjected to a hydrostatic state of i

## Abstract The existence, uniqueness, stability, and integral representation of distributional solutions are investigated for the equations of motion of a thin elastic plate with a combination of displacement and moment‐stress components prescribed on the boundary. Copyright © 2004 John Wiley & So

The work deals with boundary equations appearing if non-stationary problems for Maxwell system are solved with the help of surface-retarded potentials. The solvability of these equations is proved in some functional spaces of Sobolev type.