We address the coupling of an advection equation with a diffusion-advection equation, for solutions featuring boundary layers. We consider non-overlapping domain decompositions and we face up the heterogeneous problem using an extended variational formulation. We will prove the equivalence between the latter formulation and a treatment based on a singular perturbation theory. An exhaustive comparison in termsof solution and computational efficiency between these formulations is carried out.

Extended variational formulation for heterogeneous partial differential equations

GERVASIO, Paola;
2011-01-01

Abstract

We address the coupling of an advection equation with a diffusion-advection equation, for solutions featuring boundary layers. We consider non-overlapping domain decompositions and we face up the heterogeneous problem using an extended variational formulation. We will prove the equivalence between the latter formulation and a treatment based on a singular perturbation theory. An exhaustive comparison in termsof solution and computational efficiency between these formulations is carried out.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11379/108711
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