Nonlinear Differential Equations in Micro/nano Mechanics Application in Micro/Nano Structures and Electromechanical Systems
Auteurs : Koochi Ali, Abadyan Mohamadreza
1. Differential equations in miniature structures 2. Semi-analytical solution methods 3. Numerical methods 4. Dynamic and time-dependent equations
Dr. Mohamadreza Abadyan received the M.Sc. and Ph.D. degrees in aerospace engineering from Sharif University of Technology, Iran, in 2004 and 2010, respectively. His current research interests include the pull-in performance of MEMS/NEMSnd mechanical behavior of polymer/composites.
- Establishes the theoretical foundation required for the modeling, simulation and theoretical analysis of micro/nanostructures and MEMS/NEMS (continuum-based solid mechanics)
- Covers various solution methods for investigating the behavior of nanostructures (applied mathematics)
- Provides the simulation of different physical phenomena of covered nanostructures
Date de parution : 05-2020
Ouvrage de 270 p.
19x23.3 cm
Thèmes de Nonlinear Differential Equations in Micro/nano Mechanics :
Mots-clés :
Adomian decomposition method; Carbon nanotube; Casimir; circular micro-membrane; Consistent couple stress theory; Continuum mechanic; Differential equation; Differential transformation method; Double-sided nanobridge; Finite difference method (FDM); Finite element method (FEM); Galerkin method; Generalized differential quadrature (GDQ); Green"s function; Homotopy perturbation method; Lumped parameter method; Microcapacitor; Microelectromechanical systems (MEMS); Modified Adomian decomposition method; Monotonic iteration method; Nanoactuator; Nanobridge; Nanoelectromechanical systems (NEMS); Nanotweezers; Nanowire; Nonlinear differential equation; Paddle-type nanosensor; Pull-in instability; Size effect; Surface effect; U-shaped nanosensor; van der Waals; Variation iteration method