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Daryl L. Logan has written:

'A First Course in the Finite Element Method/Book and Disk (The Pws Series in Engineering)'

'A first course in the finite element method' -- subject(s): Finite element method

'A first course in the finite element method' -- subject(s): Finite element method

'A First Course in the Finite Element Method Using Algor' -- subject(s): Algor, Data processing, Finite element method

1 answer


Eric B. Becker has written:

'Development of non-linear finite element computer code' -- subject(s): Finite element method, Strains and stresses

'Finite elements' -- subject(s): Finite element method

1 answer


J. E. Akin has written:

'Finite element analysis with error estimators' -- subject(s): Error analysis (Mathematics), Finite element method, Structural analysis (Engineering)

'Finite Elements for Analysis and Design'

'Finite Elements for Analysis and Design'

'Application and implementation of finite element methods' -- subject(s): Data processing, Finite element method

1 answer


I. M. Smith has written:

'Programming the finite element method' -- subject(s): Data processing, Finite element method, Soil mechanics

1 answer


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B. A. Szabo has written:

'Hierarchic plate and shell models based on p-extension' -- subject(s): Finite element method, Mathematical models, Plates (Engineering), Shells (Engineering)

'Introduction to finite element analysis' -- subject(s): TECHNOLOGY & ENGINEERING / Drafting & Mechanical Drawing, Finite element method

'Solution of elastic-plastic stress analysis probems by the p-version of the finite element method' -- subject(s): Finite element method, Strains and stresses

1 answer


Pin Tong has written:

'Zhongguo jin rong yun xing yan jiu'

'Finite-element method' -- subject(s): Finite element method

1 answer


David S. Burnett has written:

'Finite element analysis' -- subject(s): Finite element method

1 answer


H. R. Schwarz has written:

'Finite element methods' -- subject(s): Finite element method

1 answer


E. Hinton has written:

'Finite element programming' -- subject(s): Data processing, Finite element method

1 answer


Juan C. Heinrich has written:

'Intermediate finite element method' -- subject(s): Mathematical models, Transmission, Heat, Finite element method, Fluid mechanics

1 answer


Chi-Kun Shi has written:

'Grid optimization by equalization of elemental strain energy content in finite element method' -- subject(s): Finite element method

1 answer


W. G. Habashi has written:

'Large-scale computational fluid dynamics by the finite element method' -- subject(s): Computational fluid dynamics, Finite element method

1 answer


Gianni Comini has written:

'Finite element analysis in heat transfer' -- subject(s): Transmission, Mathematics, Heat, Finite element method

1 answer


G. R. Liu has written:

'The finite element method' -- subject(s): Finite element method

'Mesh free methods' -- subject(s): Numerical analysis, Engineering mathematics

1 answer



Tzu-cheng Chu has written:

'Finite element analysis of translational shells' -- subject(s): Finite element method, Shells (Engineering)

1 answer


Alan E. McKim has written:

'Report on composite finite element' -- subject(s): Laminates, Composite materials, Finite element method

1 answer


Bo-nan Jiang has written:

'The origin of spurious solutions in computational electromagnetics' -- subject(s): Computational electromagnetics, Maxwell equation, Finite element method, Least squares method

'Least-squares finite elements for Stokes problem' -- subject(s): Numerical analysis, Finite element method

1 answer


Chieh Wu has written:

'A least-squares finite element method for electromagnetic scattering problems' -- subject(s): Computational fluid dynamics, Radar cross sections, Finite element method, Electromagnetic scattering, Divergence, Least squares method

1 answer


The main difference between the Rayleigh-Ritz method (RRM) and the finite element method lies in the definition of the basis functions. For FEM, these are element-related functions, whereas for RRM these are valid for the whole domain and have to fit the boundary conditions. The Rayleigh-Ritz method for homogeneous boundary conditions leads to the same discretized equations as the Galerkin method of weighted residuals.

1 answer


M. I. Friswell has written:

'Finite element model updating in structural dynamics' -- subject(s): Finite element method, Mathematical models, Structural dynamics

1 answer


A. J. Morris has written:

'Shell finite element evaluation tests'

'A practical guide to reliable finite element modelling' -- subject(s): Error analysis (Mathematics), Finite element method

2 answers


The key difference between finite element and finite volume methods in computational fluid dynamics lies in how they discretize and solve the governing equations of fluid flow.

Finite element method divides the domain into smaller elements and approximates the solution within each element using basis functions. It is more versatile for complex geometries and can handle different types of boundary conditions.

Finite volume method divides the domain into control volumes and calculates the flow variables at the center of each volume. It is more conservative in terms of mass and energy conservation and is better suited for problems with strong conservation properties.

In summary, finite element method focuses on local accuracy and flexibility in handling complex geometries, while finite volume method emphasizes global conservation properties and is more suitable for problems with strong conservation requirements.

1 answer


A. A. Lakis has written:

'Hybrid finite element analysis of circular and annular plates' -- subject(s): Vibration, Elastic plates and shells, Finite element method, Plates (Engineering)

1 answer


Howard E. Hinnant has written:

'Derivation of a tapered p-version beam finite element' -- subject(s): Beam dynamics, Finite element method

1 answer


numerical method

1:numerical method uses finite difference or finite element method approximation to solve differential equation

2:give just approximation of the perfect solution

analytical method

1:does not uses finite difference

2:give theoreticaly perfect solution.

1 answer


Qufei Xie has written:

'An analytical study and finite element modeling of chip formation in metal machining process' -- subject(s): Finite element method, Metal-cutting

1 answer


Vivette Girault has written:

'Finite element approximation of the Navier-Stokes equations' -- subject(s): Finite element method, Navier-Stokes equations, Numerical solutions, Viscous flow, Instrumentation, Airway (Medicine), Methods, Respiratory Therapy, Cardiopulmonary Resuscitation, Trachea, Airway Obstruction, Intubation, Therapy, Airway Management

'Finite element methods for Navier-Stokes equations' -- subject(s): Finite element method, Navier-Stokes equations, Numerical solutions, Viscous flow

1 answer


M. D. Deshpande has written:

'Application of FEM to estimate complex permittivity of dielectric material at microwave frequency using waveguide measurements' -- subject(s): Network analysis, Dielectrics, Rectangular waveguides, Electric networks, Finite element method, Superhigh frequencies, Permittivity, Newton-Raphson method

'Application of finite element method to analyze inflatable waveguide structures' -- subject(s): Waveguide antennas, Inflatable structures, Finite element method, Rectangular waveguides

1 answer


D. J. Dawe has written:

'Matrix and finite element displacement analysis of structures' -- subject(s): Finite element method, Matrix methods, Structural analysis (Engineering)

1 answer



Finite Element Method (FEM) is a numerical technique for solving partial differential equations by dividing the domain into smaller elements and solving for the behavior of each element. Finite Difference Method (FDM) approximates derivatives by discretizing the domain into grid points and computing the derivative at each grid point. FEM is more versatile in handling complex geometries, while FDM is simpler to implement for regular grids.

2 answers


Thomas Apel has written:

'Anisotropic finite elements' -- subject(s): Mathematics, Anisotropy, Approximation theory, Finite element method, Interpolation

1 answer


The Finite Element Method is a numerical technique used to solve complex engineering problems by dividing a structure or system into smaller elements. It is commonly used to analyze stresses, strains, heat transfer, fluid flow, and other physical phenomena in fields such as structural engineering, mechanical engineering, and aerospace engineering.

2 answers


Michael A Gerhard has written:

'OASIS, a general purpose mesh generator for finite element codes' -- subject(s): Numerical solutions, Boundary value problems, Finite element method, Computer programs

1 answer


Ever J. Barbero has written:

'Finite element analysis of composite materials' -- subject(s): Mathematical models, Composite materials, Finite element method

'Introduction to Composite Materials Design'

1 answer


John Leonidas Volakis has written:

'Derivation and application of a class of generalized impedance boundary conditions' -- subject(s): Mathematical models, Boundary layer, Surfaces (Technology)

'Semi-annual report for NASA grant NAG-2-541' -- subject(s): Geometrical diffraction, Finite element method

'Finite element method for electromagnetics' -- subject(s): Electrons, Finite element method, Electromagnetic fields, Mathematical models, Scattering, Antennas (Electronics), Microwave circuits

1 answer


Ulrich Langer has written:

'Preconditioned Uzawa-type iterative methods for solving mixed finite element equations' -- subject(s): Boundary value problems, Finite element method, Iterative methods (Mathematics)

1 answer


K. Morgan has written:

'Finite element methods for integrated aerodynamic heating analysis' -- subject(s): Finite element method, Aerodynamic heating

'Unstructured grid methods for the simulation of 3D transient flows'

1 answer


Thomas Kerkhoven has written:

'L [infinity] stability of finite element approximations to elliptic gradient equations' -- subject(s): Boundary value problems, Elliptic Differential equations, Finite element method, Stability

1 answer


Finite element methods are used to approximate solutions to complex engineering problems that cannot be solved analytically. They are especially useful in structural analysis, heat transfer, fluid dynamics, and electromagnetic field problems. By understanding finite element methods, engineers can design more efficient and reliable structures and systems, as well as optimize performance while minimizing materials and costs.

2 answers


Terence M. O'Donnell has written:

'Solution techniques for the finite element analysis of nonlinear magnetostatic problems in 2 and 3 dimensions' -- subject(s): Engineering mathematics, Finite element method, Electromagnetic fields

1 answer


Oktay Ural has written:

'Matrix operations and use of computers in structural engineering' -- subject(s): Data processing, Matrix methods, Structural analysis (Engineering)

'Finite element method: basic concepts and applications' -- subject(s): Finite element method, Matrices, Structural analysis (Engineering)

1 answer


Robert J. Melosh has written:

'Manipulation errors in finite element analysis of structures' -- subject(s): Data processing, Error analysis (Mathematics), Structural analysis (Engineering)

'Structural engineering analysis by finite elements' -- subject(s): Finite element method, Structural analysis (Engineering)

1 answer


Louis Komzsik has written:

'MSC/NASTRAN Numerical Methods User's Guide'

'The Lanczos method' -- subject(s): Computer algorithms, Mathematics, Numerical analysis, Computer science, Eigenvalues

'What every engineer should know about computational techniques of finite element analysis' -- subject(s): Finite element method

1 answer


Ellis Harold Dill has written:

'The finite element method for mechanics of solids with ANSYS applications' -- subject(s): ANSYS (Computer system), Engineering mathematics, Finite element method, TECHNOLOGY & ENGINEERING / Industrial Design / General, SCIENCE / Mechanics / General, Continuum mechanics, TECHNOLOGY & ENGINEERING / Mechanical

1 answer


Leo C. Kempel has written:

'A Finite element-boundary integral method for conformal antenna arrays on a circular cylinder' -- subject(s): Finite element method, Antenna arrays

'Radiation and scattering from printed antennas on cylindrically conformal platforms' -- subject(s): Scattering (Physics), Antenna arrays

1 answer


Ajay K. Pandey has written:

'Thermal-structural finite element analysis using linear flux formulation' -- subject(s): Mathematical models, Structural analysis, Steady state, Finite element method, Thermal analysis

1 answer


Steven W. Kohut has written:

'Strain enriched microplane model for finite element analysis of unreinforced concrete' -- subject(s): Mathematical models, Concrete, Finite element method, Computer programs, Testing, Strains and stresses

1 answer


The Finite Element Method (FEM) is a numerical technique for solving partial differential equations by dividing a complex system into smaller elements, solving these elements individually, and then combining the solutions. It is widely used in engineering and physics for simulations involving stress analysis, heat transfer, fluid dynamics, and other physical phenomena. FEM provides a flexible and efficient approach to modeling and analyzing complex systems with accuracy and computational efficiency.

2 answers