【摘 要】
:
We consider multi-component two-phase systems modeled by a diffusive interface model equipped with van der Waals equation of state(EOS).We propose an efficient numerical solution of the modeling syste
【机 构】
:
King Abdullah Univ.of Sci.& Tech. The Hong Kong P
论文部分内容阅读
We consider multi-component two-phase systems modeled by a diffusive interface model equipped with van der Waals equation of state(EOS).We propose an efficient numerical solution of the modeling system,focusing on discrete energy stability,local mass conservation and numerical accuracy.
其他文献
Reliability plays a crucial role to enhance the performance of any complex industrial system constituted by number of repairable components following different types of failures/repairs.Data uncertain
This research examines if there exists an ideal distribution for jump amplitude in the sense that with this distribution,the stochastic volatility double jump-diffusions(SVJJ)model would potentially h
In this paper,we have studied higher order theory of gravity which is based on conformal non-invariance of gravitational wave equations.These waves are inevitable consequences of Einstein theory which
The aim of the present paper is to analyze the second order slip effects on entropy generation of an incompressible,viscous and electrically conducting water based nanofluid boundary layer flow over a
Different iterative procedures have been used to approximate fixed points of multivalued mappings.Many authors have intensively studied the fixed point theorems and got some results.They extended thes
In this paper,we investigate the emergence of spatiotemporal patterns of a predator-prey system with cross diffusion.First we compute the critical lines of Hopf and Turing bifurcations in a spatial do
Fractional Partial Differential Equations(FPDEs)are emerging as a new powerful tool for modeling many difficult complex systems,i.e.,systems with overlapping microscopic and macroscopic scales or syst
A novel 2nd-order algorithm for Riesz derivatives is established through constructing a new generating function and applying the shift technique.Applying this algorithm to Riesz type partial different
We discuss high-order methods inspired by the multi-step Adams methods for systems of fractional differential equations.The schemes are based on an expansion in a weighted space.We discuss the local t
Isotropic and nematic are two important phases for liquid crystals materials.In this talk,we will discuss the isotropic-nematic problem in the framework of Landau-de Gennes theory.Specifically,we will