Regularizing properties and propagations of singularities for thermoelastic plates

We study dissipative models for plates and we show that the solutions have a smoothing effect on the initial data for viscous plates, while for materials with memory the solution propagates singularities, that is, the solution of the plate equation of memory type is as regular as the initial data. M

## Abstract The propagation of singularities of solutions to the Cauchy problem of a semilinear thermoelastic system with microtemperatures in one space variable is studied. First, by using a diagonalization argument of phase space analysis, the coupled thermoelastic system with microtemperatures w

The solution of an initial-boundary value problem for bending of a piecewise-homogeneous thermoelastic plate with transverse shear deformation is represented as various combinations of single-layer and double-layer time-dependent potentials. The unique solvability of the boundary integral equations

problem of computing the transfer function matrices for regular and singular discrete two-dimensional general state-space models (2D GM) is discussed, and some programmable algorithms are developed that generalize the well-known Leverrier algorithm to 2D systems of general form. The results also sho

## Abstract A new discrete singular convolution (DSC) method is developed for vibration, buckling and static analyses of arbitrary straight‐sided quadrilateral plates. The straight‐sided quadrilateral domain is mapped into a square domain in the computational space using a four‐node element. By usi