This work deals with a novel three-dimensional finite-volume non-hydrostatic shock-capturing model for the simulation of wave transformation processes and wave-structure interaction. The model is based on an integral formulation of the Navier-Stokes equations solved on a coordinate system in which the vertical coordinate is varying in time. A finite-volume shock-capturing numerical technique based on high order WENO reconstructions is adopted in order to discretize the fluid motion equations.
On the integral form of the motion equations for free surface flow / Cannata, Giovanni; Petrelli, Chiara; Barsi, Luca; Camilli, Flaminia; Gallerano, Francesco. - In: INTERNATIONAL JOURNAL OF THEORETICAL AND APPLIED MECHANICS. - ISSN 2367-8992. - ELETTRONICO. - 2:(2017), pp. 66-72.
On the integral form of the motion equations for free surface flow
Giovanni Cannata;Chiara Petrelli;Luca Barsi;Flaminia Camilli;Francesco Gallerano
2017
Abstract
This work deals with a novel three-dimensional finite-volume non-hydrostatic shock-capturing model for the simulation of wave transformation processes and wave-structure interaction. The model is based on an integral formulation of the Navier-Stokes equations solved on a coordinate system in which the vertical coordinate is varying in time. A finite-volume shock-capturing numerical technique based on high order WENO reconstructions is adopted in order to discretize the fluid motion equations.| File | Dimensione | Formato | |
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