Practical evaluation of flows due to arbitrary singularity distributions in the 3D theory of ship motions in regular waves at \(\tau < 1 \slash 4\)
From MaRDI portal
Publication:2022871
DOI10.1016/j.euromechflu.2020.05.007zbMath1477.76023OpenAlexW3027115756MaRDI QIDQ2022871
Francis Noblesse, Chen-Jun Yang, Huiyu Wu, Jiayi He, Ren-Chuan Zhu
Publication date: 30 April 2021
Published in: European Journal of Mechanics. B. Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.euromechflu.2020.05.007
Related Items (4)
Practical evaluation of flows due to arbitrary singularity distributions in the 3D theory of ship motions in regular waves at \(0.3 \leq \tau \) ⋮ Optimal Fourier-Kochin flow representations in ship and offshore hydrodynamics: theory ⋮ An alternative linear flow model and boundary integral flow representation for ship motions in regular waves ⋮ Practical representation of flows due to general singularity distributions for wave diffraction-radiation by offshore structures in finite water depth
Cites Work
- The Neumann-Michell theory of ship waves
- Straightforward approximation of the translating and pulsating free surface Green function
- Harmonic function expansion for translating Green functions and dissipative free-surface waves
- Practical mathematical representation of the flow due to a distribution of sources on a steadily advancing ship hull
- Alternative integral representations for the Green function of the theory of ship wave resistance
- Interference effects on the Kelvin wake of a monohull ship represented via a continuous distribution of sources
- Errors due to a practical Green function for steady ship waves
- Interference effects on the Kelvin wake of a catamaran represented via a hull-surface distribution of sources
- Nonlinear corrections of linear potential-flow theory of ship waves
- Influence of Froude number and submergence depth on wave patterns
- Regular wave integral approach to the prediction of hydrodynamic performance of submerged spheroid
- Boundary integral representations of steady flow around a ship
- Neumann-Michell theory of short ship waves
- Numerical implementation and validation of the Neumann-Michell theory of ship waves
- Practical flow-representations for arbitrary singularity-distributions in ship and offshore hydrodynamics, with applications to steady ship waves and wave diffraction-radiation by offshore structures
- Froude number, hull shape, and convergence of integral representation of ship waves
- Boundary-integral representations for ship motions in regular waves
- Regular wave integral approach to numerical simulation of radiation and diffraction of surface waves
This page was built for publication: Practical evaluation of flows due to arbitrary singularity distributions in the 3D theory of ship motions in regular waves at \(\tau < 1 \slash 4\)
