000012540 001__ 12540
000012540 005__ 20160816160225.0
000012540 04107 $$aeng
000012540 046__ $$k2015-12-28
000012540 100__ $$aKadioglu, Fethi
000012540 24500 $$aVISCOELASTIC KIRCHHOFF PLATE ANALYSIS VIA MIXED FINITE ELEMENT FORMULATION
000012540 24630 $$n3.$$pProceedings of the 3rd International Conference on Advances in Civil, Structural and Mechanical Engineering
000012540 260__ $$bInstitute of Research Engineers and Doctors
000012540 506__ $$arestricted
000012540 520__ $$2eng$$aIn this study, a functional for the dynamic analysis of viscoelastic Kirchhoff plates is obtained through an efficient systematic procedure based on the Gateaux Differential Method. For the solution of the derived functional, mixed finite element method in transformed Laplace-Carson space is used. In this functional, there exists four independent variables such as deflection (w), internal forces (M<sub>x</sub>, M<sub>y</sub>, M<sub>xy</sub>) in addition to the dynamic and geometric boundary condition terms. For modeling the viscoelastic behavior, four parameter solid model is employed. For transformation of the solutions obtained in the Laplace-Carson domain to the time domain, different numerical inverse transform techniques are employed. The developed solution technique is applied to several dynamic example problems for the verification of the suggested numerical procedure.
000012540 540__ $$aText je chráněný podle autorského zákona č. 121/2000 Sb.
000012540 653__ $$a Dynamic analysis, viscoelastic plates, Gâteaux differential, mixed finite element method, Laplace-Carson transform.
000012540 7112_ $$a 3rd International Conference on Advances in Civil, Structural and Mechanical Engineering$$cBangkok, Thailand$$d2015-12-28 / 2015-12-29$$gACSM3
000012540 720__ $$aKadioglu, Fethi$$iTekin, Gulcin
000012540 8560_ $$ffischerc@itam.cas.cz
000012540 8564_ $$s630164$$uhttp://invenio.itam.cas.cz/record/12540/files/ACSM-15-491.pdf$$yOriginal version of the author's contribution as presented on CD, id ACSM-15-491, doi: 10.15224/978-1-63248-083-5-28.
000012540 962__ $$r12525
000012540 980__ $$aPAPER
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