000002756 001__ 2756 000002756 005__ 20141118153421.0 000002756 04107 $$acze 000002756 046__ $$k2008-12-04 000002756 100__ $$aSumec, J. 000002756 24500 $$aRovnice veľkých priehybov väzkopružných anizotropných dosák 000002756 24630 $$n1.$$p70 Years of FCE STU - Proceedings of the International Scientific Conference 000002756 260__ $$bSlovak University of Technology in Bratislava, Faculty of Civil Engineering, 2008 000002756 506__ $$arestricted 000002756 520__ $$2eng$$aFormulation of the assumptions of the solved problem. Design of the rheological model for viscoelastc plate. Constitutive equations of the viscoelastic boundary value problem. Material of the plate is modelled as a linearly anisotropic viscoelastic medium. Size of the vertical displacement (deflections) are comparable with the plate thickness. Tensor calculus for derivation of the governing equations is used. 000002756 540__ $$aText je chráněný podle autorského zákona č. 121/2000 Sb. 000002756 653__ $$aRovnice rovnováhy, fyzikálne rovnice, veľké priehyby, metrický tenzor, Christoffelove symboly, Voigtov reologický model, Laplaceova integrálna transformácia. 000002756 7112_ $$aInternational Scientific Conference 70 Years of FCE STU$$cBratislava (SK)$$d2008-12-04 / 2008-12-05$$gHMC13 000002756 720__ $$aSumec, J.$$iVéghová, I. 000002756 8560_ $$ffischerc@itam.cas.cz 000002756 8564_ $$s184029$$uhttps://invenio.itam.cas.cz/record/2756/files/02_E_Sumec_Veghova.pdf$$y Original version of the author's contribution as presented on CD, . 000002756 962__ $$r2540 000002756 980__ $$aPAPER