Static and dynamic behavior of multilayered magneto-electro-elastic laminates with viscoelastic interfaces under different boundary conditions

In this communication, a methodological approach based on the combination of the state space method and the differential quadrature method (SS-DQM) is used to analyze the static and dynamic behavior of magneto-electro-elastic rectangular plates with viscoelastic interfaces based on a Winkler-Pasternak elastic support and with different boundary conditions. The state space method is used to estimate the solution in the thickness direction with an arbitrary number and different types of layers, whereas the DQM method is used to take into account all the boundary conditions. Afterward, to convert the obtain solutions from Laplace domain to temporary one we use the inverse Laplace transform.In this communication, a methodological approach based on the combination of the state space method and the differential quadrature method (SS-DQM) is used to analyze the static and dynamic behavior of magneto-electro-elastic rectangular plates with viscoelastic interfaces based on a Winkler-Pasternak elastic support and with different boundary conditions. The state space method is used to estimate the solution in the thickness direction with an arbitrary number and different types of layers, whereas the DQM method is used to take into account all the boundary conditions. Afterward, to convert the obtain solutions from Laplace domain to temporary one we use the inverse Laplace transform.