We found a match
Your institution may have access to this item. Find your institution then sign in to continue.
- Title
Computational analysis of the nonlinear vibrational behavior of perforated plates with initial imperfection using NURBS-based isogeometric approach.
- Authors
VeisiAra, Abdollah; Mohammad-Sedighi, Hamid; Reza, Arash
- Abstract
In this article, an isogeometric analysis through NURBS basis functions is presented to study the nonlinear vibrational behavior of perforated plates with initial imperfection. In this regard, the governing equations of plate dynamics, as well as the displacement-strain relations, are derived using the Mindlin-Reissner plate theory by considering von Karman nonlinearity. The geometry of the structure is formed by selecting the order of NURBS basis functions and the number of control points according to the physics of the problem. Since similar basis functions are utilized to estimate the accurate geometry and displacement field of the domain, the order of the basic functions and the number of control points are optimized for the proper approximation of the unknown field variables. By utilizing the energy approach and Hamilton principle and discretizing the equations of motion, the vibrational response of the perforated imperfect plate is extracted through an eigenvalue problem. The results of linear vibrations, geometrically nonlinear vibrations, and nonlinear vibrations of imperfect plates are separately validated by considering the previously reported findings, which shows a satisfactory agreement. Thereafter, a coefficient of the first mode shape is considered as the initial imperfection and the vibrational analysis is reexamined. Furthermore, the nonlinear vibrations of the perforated plate with initial imperfection are analysed using an iterative approach. The effects of the perforated hole, initial imperfection, and geometric nonlinearity are also addressed and discussed.
- Subjects
ISOGEOMETRIC analysis; VIBRATION (Mechanics); VON Karman equations; NONLINEAR theories; ITERATIVE methods (Mathematics); LINEAR vibration
- Publication
Journal of Computational Design & Engineering, 2021, Vol 8, Issue 5, p1307
- ISSN
2288-4300
- Publication type
Article
- DOI
10.1093/jcde/qwab043