Finite Element Methods and Applications
A special issue of Axioms (ISSN 2075-1680). This special issue belongs to the section "Mathematical Analysis".
Deadline for manuscript submissions: closed (30 November 2022) | Viewed by 1329
Special Issue Editors
Interests: immersed finite element method; numerical plasma simulation; particle-in-cell simulation; CFD
Interests: finite element method; dimensional splitting; operator splitting; parallel algorithms; variational multiscale; adaptive techniques
Interests: numerical analysis for fluid models, such as Navier–Stokes equations and MHD equations; decoupled methods for multiphysics problems; grad–div stabilization for finite element methods
Special Issue Information
Dear Colleagues,
The finite element method (FEM) is a popular method for numerically solving differential equations that arise in engineering and mathematical modeling. The FEM is applied to a large variety of mathematical, multi-physics and multi-scale science and engineering problems. Typical problem areas of interest include the traditional fields of structural analysis, heat transfer, fluid flow, mass transport, and electromagnetic potential.
The finite element method (FEM) has significantly improved both the standard of engineering designs and the methodology of the design process in many industrial applications. The benefits of FEM include increased accuracy, enhanced design, better insights into critical design parameters, virtual prototyping, fewer hardware prototypes, a faster and less expensive design cycle, increased productivity, and increased revenue.
This Special Issue, entitled “Finite Element Methods and Applications”, intends to collect selected review works written by well-known researchers in the field, as well as the current developments in the application of the FEM to engineering designs and physical problems in engineering and science.
Topics addressed in this Special Issue include, but are not limited to:
- Finite element method in engineering designs;
- Finite element method in the numerical simulation of physical problems.
Dr. Yong Cao
Dr. Feng Shi
Dr. Yao Rong
Guest Editors
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Keywords
- finite element method (FEM)
- computational modeling
- numerical simulation
- multi-physics multi-scale problems
- engineering problems
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