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A pseudospectral Chebychev method for the 2D wave equation with domain stretching and absorbing boundary conditions
Rosemary Renaut
, Jochen Fröhlich
Mathematical and Statistical Sciences, School of (SoMSS)
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Article
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peer-review
34
Scopus citations
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Dive into the research topics of 'A pseudospectral Chebychev method for the 2D wave equation with domain stretching and absorbing boundary conditions'. Together they form a unique fingerprint.
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Mathematics
Absorbing Boundary Conditions
100%
Pseudospectral Method
93%
Wave equation
62%
Reflection Coefficient
31%
Grid
19%
Numerical Results
16%
Acoustic Waves
15%
Fourier Method
14%
Wave Propagation
13%
Absorption
13%
Damping
11%
Estimate
11%
Differential operator
10%
Bounded Domain
9%
Simulation
7%
Eigenvalue
7%
Demonstrate
7%
Performance
7%
Standards
6%
Model
4%
Engineering & Materials Science
Wave equations
94%
Stretching
79%
Boundary conditions
57%
Wave propagation
39%
Mathematical operators
34%
Acoustic waves
29%
Damping
28%
Physics & Astronomy
boundary conditions
53%
grids
40%
reflectance
34%
differential operators
32%
estimates
29%
eigenvalues
21%
wave propagation
21%
damping
19%
acoustics
14%
performance
10%
simulation
9%