Simulation of hydraulic jumps in the presence of rotation and mountains

An implicit finite difference formulation of the nonlinear shallow water equations is developed to allow for the treatment of tidal bores and hydraulic jumps. Five different schemes are investigated involving upwind treatment of convective terms, central differences combined with dissipative interfa

## Abstract This study derives optimal hedge ratios with infrequent extreme news events modeled as common jumps in foreign currency spot and futures rates. A dynamic hedging strategy based on a bivariate GARCH model augmented with a common jump component is proposed to manage currency risk. We find

We performed axisymmetric r-z simulations to clarify the structure formation of the circular hydraulic jump. The transition from a type I to a type II jump, which was induced by changing the depth of the fluid far away from the jet in the laboratory experiment, was investigated numerically. We found

A numerical simulation has been performed to investigate planar and radial #ows of thin liquid "lm subject to constant wall temperature or constant wall heat #ux, considering the surface tension e!ect. To simulate the variation of the "lm height including a hydraulic jump, an Arbitrary Lagrangian}Eu