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Well-posedness of two-dimensional hydroelastic waves
David M. Ambrose,
Michael Siegel
Center for Applied Mathematics and Statistics
Mathematical Sciences
Research output
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Contribution to journal
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Article
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peer-review
16
Scopus citations
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Dive into the research topics of 'Well-posedness of two-dimensional hydroelastic waves'. Together they form a unique fingerprint.
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Keyphrases
Two Dimensional
100%
Well-posedness
100%
Hydroelastic Waves
100%
Surface Tension
50%
Spatial Dimension
50%
Numerical Computation
50%
High-order
50%
Interfacial Flows
50%
Elastic Sheet
50%
Two-dimensional Potential Flow
50%
Initial Value Problem
50%
Nonlocal Term
50%
Elastic Membrane
50%
Membrane Tension
50%
Vortex Sheet
50%
Energy Estimates
50%
Arc Length
50%
Well-posedness Theory
50%
Well-posedness in Sobolev Spaces
50%
Bending Stress
50%
A-priori Bounds
50%
Engineering
Two Dimensional
100%
Posedness
100%
Energy Engineering
66%
Tension Surface
33%
Spatial Dimension
33%
Numerical Computation
33%
Initial Value
33%
Two-Dimensional Potential-Flow
33%
Membrane Tension
33%
Elastic Membrane
33%
Vortex Sheet
33%
Bending Stress
33%
Mathematics
Posedness
100%
Numerical Computation
33%
Initial-Value Problem
33%
Spatial Dimension
33%
Potential Flow
33%
Sobolev Space
33%