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Playford Trust Scholarships Awarded For 2024

Playford Trust Scholarships Awarded For 2024
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Adelaide
South-australia
Australia
Mount-gunson
University-of-south-australia
Flinders-university
Clare-high-school
Loxton-high-school
University-of-adelaide
Australian
Michael-lapointe
Vries-kd

Generation and propagation of acoustic solitons in a periodic waveguide of air-water metamaterials

Generation and propagation of acoustic solitons in a periodic waveguide of air-water metamaterials
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Vries-kd
Martin-krustal
Norman-zabusky
Nonlinear-schr
Korteweg-de-vries
Ion-acoustic-solitons
Finite-elements

"Whitham shocks and resonant dispersive shock waves governed by the hig" by Saleh Baqer and Noel F. Smyth

The addition of higher order asymptotic corrections to the Korteweg-de Vries equation results in the extended Korteweg-de Vries (eKdV) equation. These higher order terms destabilize the dispersive shock wave solution, also termed an undular bore in fluid dynamics, and result in the emission of resonant radiation. In broad terms, there are three possible dispersive shock wave regimes: radiating dispersive shock wave (RDSW), cross-over dispersive shock wave (CDSW) and travelling dispersive shock wave (TDSW). While there are existing solutions for the RDSW and TDSW regimes obtained using modulation theory, there is no existing solution for the CDSW regime. Modulation theory and the associated concept of a Whitham shock are used to obtain this CDSW solution. In addition, it is found that the resonant wavetrain emitted by the eKdV equation with water wave coefficients has a minimal amplitude. This minimal amplitude is explained based on the developed Whitham modulation theory.

Korteweg-de-vries
Dispersive-shock-wave
Orteweg-de-vries-equation
Resonance
Undular-bore
Water-waves
Hitham-shock

talks.cam : Numerical renormalization group-based approach to secular perturbation theory

talks.cam : Numerical renormalization group-based approach to secular perturbation theory
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Justin-ripley
Korteweg-de-vries
Talks
Seminars
University-of-cambridge

"Higher-dimensional extended shallow water equations and resonant solit" by Theodoros P. Horikis, Dimitrios J. Frantzeskakis et al.

The higher order corrections to the equations that describe nonlinear wave motion in shallow water are derived from the water wave equations. In particular, the extended cylindrical Korteweg-de Vries and Kadomtsev-Petviashvili equations which include higher order nonlinear, dispersive, and nonlocal terms are derived from the Euler system in (2+1) dimensions, using asymptotic expansions. It is thus found that the nonlocal terms are inherent only to the higher dimensional problem, both in cylindrical and Cartesian geometry. Asymptotic theory is used to study the resonant radiation generated by solitary waves governed by the extended equations, with an excellent comparison obtained between the theoretical predictions for the resonant radiation amplitude and the numerical solutions. In addition, resonant dispersive shock waves (undular bores) governed by the extended equations are studied. It is shown that the asymptotic theory, applicable for solitary waves, also provides an accurate esti

Korteweg-de-vries