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Nonlinear waves over highly variable topography
A. Nachbin,
W. Choi
Mathematical Sciences
Research output
:
Contribution to journal
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Review article
›
peer-review
4
Scopus citations
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Dive into the research topics of 'Nonlinear waves over highly variable topography'. Together they form a unique fingerprint.
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Keyphrases
Nonlinear Waves
100%
Partial Differential Equations
100%
Variable Topography
100%
Water Waves
100%
Mathematical Modeling
50%
Surface Waves
50%
Meteorology
50%
Internal Waves
50%
Physical Oceanography
50%
Reduced Model
50%
Asymptotic Analysis
50%
Geophysics
50%
Mathematical Formulation
50%
Partial Differential Equation Systems
50%
Strongly Nonlinear
50%
Weakly Nonlinear
50%
Variable Depth
50%
Water Type
50%
Solution Analysis
50%
Water Wave Models
50%
Fully Dispersive
50%
Varying Coefficient
50%
Coastal Waves
50%
Topographic Heterogeneity
50%
Long Waves
50%
Long Pulse
50%
Heterogeneous Media
50%
Mathematics
Non-Linear Wave
100%
Partial Differential Equation
100%
Asymptotics
50%
Reduced Model
50%
Mathematical Modeling
50%
Asymptotic Analysis
50%
Systems Of Partial Differential Equations
50%
Dispersive
50%
Mathematical Formulation
50%
Physics
Nonlinear Wave
100%
Partial Differential Equation
100%
Water Wave
100%
Geophysics
33%
Physical Oceanography
33%
Internal Wave
33%
Surface Waves
33%
Earth and Planetary Sciences
Nonlinear Wave
100%
Water Wave
100%
Surface Wave
33%
Physical Oceanography
33%
Internal Wave
33%
Geophysics
33%
Heterogeneous Medium
33%
Engineering
Partial Differential Equation
100%
Mathematical Modeling
33%
Internal Wave
33%
Propagating Wave
33%
Wave Model
33%
Review Paper
33%