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An Immersed Interface Method for the Simulation of Inextensible Interfaces in Viscous Fluids
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作者 Zhijun Tan D.V.Le +1 位作者 K.M.Lim B.C.Khoo 《Communications in Computational Physics》 SCIE 2012年第3期925-950,共26页
In this paper,an immersed interface method is presented to simulate the dynamics of inextensible interfaces in an incompressible flow.The tension is introduced as an augmented variable to satisfy the constraint of int... In this paper,an immersed interface method is presented to simulate the dynamics of inextensible interfaces in an incompressible flow.The tension is introduced as an augmented variable to satisfy the constraint of interface inextensibility,and the resulting augmented system is solved by the GMRES method.In this work,the arclength of the interface is locally and globally conserved as the enclosed region undergoes deformation.The forces at the interface are calculated from the configuration of the interface and the computed augmented variable,and then applied to the fluid through the related jump conditions.The governing equations are discretized on a MAC grid via a second-order finite difference scheme which incorporates jump contributions and solved by the conjugate gradient Uzawa-type method.The proposed method is applied to several examples including the deformation of a liquid capsule with inextensible interfaces in a shear flow.Numerical results reveal that both the area enclosed by interface and arclength of interface are conserved well simultaneously.These provide further evidence on the capability of the present method to simulate incompressible flows involving inextensible interfaces. 展开更多
关键词 inextensible interface Stokes flows singular force immersed interface method CGUzawa method front tracking
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MOTIONS OF CURVES IN THE GALILEAN SPACE G_3
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作者 Ufuk OZTURK Suleyman CENGIZ Esra Betul KOC OZTURK 《Acta Mathematica Scientia》 SCIE CSCD 2015年第5期1046-1054,共9页
In this article, we study the flows of curves in the Galilean 3-space and its equiform geometry without any constraints. We find that the Frenet equations and the intrinsic quantities of the inelastic flows of curves ... In this article, we study the flows of curves in the Galilean 3-space and its equiform geometry without any constraints. We find that the Frenet equations and the intrinsic quantities of the inelastic flows of curves are independent of time. We show that the motion of curves in the Galilean 3-space and its equiform geometry are described by the inviscid and viscous Burgers' equations. 展开更多
关键词 Galilean geometry equiform geometry motions of curves inextensible flows Burgers' equation Frenet frames
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