Yotsawat TerapabkajorndedSomsak OrankitjaroenChristian LichtLaboratoire de Mécanique et Génie Civil, Université de MontpellierSouth Carolina Commission on Higher EducationMahidol University2020-01-272020-01-272019-12-01Advances in Difference Equations. Vol.2019, No.1 (2019)16871847168718392-s2.0-85065918057https://repository.li.mahidol.ac.th/handle/20.500.14594/51215© 2019, The Author(s). We confirm the study (Licht in C. R., Méc. 341:697–700, 2013) devoted to the quasi-static response for a visco-elastic Kelvin–Voigt plate whose thickness goes to zero. For each thickness parameter, the quasi-static response is given by a system of partial differential equations with initial and boundary conditions. Reformulating scaled systems into a family of evolution equations in Hilbert spaces of possible states with finite energy, we use Trotter theory of convergence of semi-groups of linear operators to identify the asymptotic behavior of the system. The asymptotic model we obtain and the genuine one have the same structure except an occurrence of a new state variable. Eliminating the new state variable from our asymptotic model leads to the asymptotic model in (Licht in C. R., Méc. 341:697–700, 2013) which involves an integro-differential system.Mahidol UniversityMathematicsArticleSCOPUS10.1186/s13662-019-2104-6