Abstract

This work is devoted to elaboration of finite element approach for the numerical analysis of parameters of the stress-strain state of the rubber-metal seismic bearing under viscoelastic deformation in the presence of layers of porous rubber. Elastic characteristics of porous rubber were determined by self-consistency method for the spherical pores. The integral relations on the basis of Boltzmann-Volterra hereditary theory have been used for viscoelastic behavior modeling. The exponential core containing instant and long elastic characteristics of the material has been used as core of relaxation. The finite element model of deforming the construction with spatial discretization and time discretization was built on the basis of the variational principle. The resulting system of resolving equations contains the additional load vector modeling the rheological constituents of the deformation process; a modified Newton-Kantorovich method has been used to solve this system. For increasing the accuracy of numerical results the precise finite element moment scheme with cubic approximation of displacements has been applied. The numerical convergence of the finite element schemes has been studied on the example of solution of Lame problem for hollow viscoelastic cylinder made of porous rubber. The rubber-metal seismic bearing was calculated on the assumption of the relaxation of the shift module of porous rubber only. The basic parameters of the stress-strain state have been obtained depending on the time and the applicable stamps of rubber.

Highlights

  • Разработан конечно-элементный подход для численного анализа параметров напряжённо-деформированного состояния резинометаллической сейсмоопоры в условиях вязкоупругого деформирования при наличии слоев из пористой резины

  • В выражении (6) δW является вариацией энергии упругого деформирования, которая зависит от истории нагружения, но не зависит от закона изменения деформации во времени и служит основой формирования матрицы жёсткости конечных элементов [Ks t ] для фиксированного момента времени t

  • Received 20/XII/2013; received in revised form 29/I/2014; accepted 21/II/2014

Read more

Summary

Общероссийский математический портал

Использование Общероссийского математического портала MathNet.Ru подразумевает, что вы прочитали и согласны с пользовательским соглашением http://www.mathnet.ru/rus/agreement

Механика деформируемого твёрдого тела
Размеры сетки

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Disclaimer: All third-party content on this website/platform is and will remain the property of their respective owners and is provided on "as is" basis without any warranties, express or implied. Use of third-party content does not indicate any affiliation, sponsorship with or endorsement by them. Any references to third-party content is to identify the corresponding services and shall be considered fair use under The CopyrightLaw.