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A projection method for constructing a mass conservative velocity field

✍ Scribed by S. Chippada; C.N. Dawson; M.L. Martínez; M.F. Wheeler

Book ID
104268134
Publisher
Elsevier Science
Year
1998
Tongue
English
Weight
754 KB
Volume
157
Category
Article
ISSN
0045-7825

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✦ Synopsis

In the numerical modeling of fluid flow and transport problems, the velocity field frequently needs to be projected from one finite dimensional space into another. In certain applications, especially those involving modeling of multi-species transport, the new projected velocity field should be accurate as well as locally mass conservative.

In this paper, a velocity projection method has been developed that is both accurate and mass conservative element-by-element on the projected grid. The velocity correction is expressed as gradient of a scalar pressure field, and the resultant Poisson equation is solved using a mixed/hybrid finite element method and lowest-order Raviart-Thomas spaces. The conservative projection method is applied to the system of shallow water equations and a theoretical error estimate is derived.

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✍ Ann S. Almgren; John B. Bell; Phillip Colella; Louis H. Howell; Michael L. Welco 📂 Article 📅 1998 🏛 Elsevier Science 🌐 English ⚖ 621 KB

In this paper we present a method for solving the equations governing timedependent, variable density incompressible flow in two or three dimensions on an adaptive hierarchy of grids. The method is based on a projection formulation in which we first solve advection-diffusion equations to predict int