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Pseudo spectral methods applied to problems in elasticity
Chris Talbot,
Andrew Crampton
Department of Computer Science
School of Computing and Engineering
Research output
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Contribution to journal
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Article
›
peer-review
2
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Citations (Scopus)
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Keyphrases
Pseudospectral Method
100%
Navier Equation
100%
Friction Effect
50%
Two Dimensional
50%
Parameter Change
50%
Attractive Alternatives
50%
Fourier
50%
Pseudospectral Approach
50%
Two-dimensional Elasticity
50%
Nonlinear Friction
50%
Elastodynamic Problem
50%
First Derivative
50%
Finite Element Procedure
50%
Eigenvalues
50%
Poling Conditions
50%
Parameter Influence
50%
Disc Brake Noise
50%
Graphical Output
50%
Spectral Accuracy
50%
Chebyshev Method
50%
Pseudospectrum
50%
Three-dimensional Elasticity
50%
Partial Differential Equation Systems
50%
Derivative Boundary Condition
50%
Engineering
Friction Effect
100%
Model System
100%
Two Dimensional
100%
Finite Element Analysis
100%
Partial Differential Equation
100%
Disk Brake
100%
Eigenvalue
100%
Simplest Case
100%
Spectral Approach
100%
Boundary Condition
100%
Brake Noise
100%
Mathematics
Navier Equation
100%
Spectral Method
100%
Nonlinear
100%
Eigenvalue
50%
Boundary Condition
50%
Chebyshev's Method
50%
Finite Element Method
50%
Simplest Case
50%
Systems Of Partial Differential Equations
50%
Time Step
50%