
The paper introduces a conservative Eulerian finite element method for the transport and diffusion of a scalar quantity in a time-dependent domain. The method is based on a reformulation of the partial differential equation to derive a scheme that conserves the quantity under consideration exactly on the discrete level.


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a-conservative-eulerian-finite-element-method-for-scalar-transport-and-diffusion-in-moving-domains


A Conservative Eulerian Finite Element Method for Scalar Transport and Diffusion in Moving Domains
