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On the numerical solution of a driven thin film equation

✍ Scribed by Youngsoo Ha; Yong-Jung Kim; Tim G. Myers

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
398 KB
Volume
227
Category
Article
ISSN
0021-9991

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✦ Synopsis

This paper is devoted to comparing numerical schemes for a differential equation with convection and fourth-order diffusion. Our model equation is

which arises in the context of thin film flow. First we employ implicit schemes and treat both convection and diffusion terms implicitly. Then the convection terms are treated with wellknown explicit schemes, namely Godunov, WENO and an upwind-type scheme, while the diffusion term is still treated implicitly. The diffusion and convection schemes are combined using a fractional step-splitting method.

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## Abstract A predictor–corrector (P–C) scheme based on the use of rational approximants of second‐order to the matrix‐exponential term in a three‐time level reccurence relation is applied to the nonlinear Klein‐Gordon equation. This scheme is accelerated by using a modification (MPC) in which the