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Selections of shape functions for dimensional reduction to Helmholtz's equation

✍ Scribed by Kang–Man Liu; Ivo Babus̆ka

Book ID
101272653
Publisher
John Wiley and Sons
Year
1999
Tongue
English
Weight
488 KB
Volume
15
Category
Article
ISSN
0749-159X

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✦ Synopsis

The boundary value problem of Helmholtz's equation on a n + 1 dimensional thin slab is approximated by appropriate systems of the n-dimensional boundary value problem. The very detailed estimates for modeling error in the H 1 -norm demonstrate convergence when the thickness of the slab approaches 0 as well as when the size of the systems approaches infinity. Shape functions through the thickness are first selected by finitely many eigenfunctions, and the tail is then selected to consist of polynomials. The presence of two types of functions gives rise to a certain choice in the selection of a particular set of shape functions. Numerical results provide a good illustration of the effect of different choices for specific problems.

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A least squares finite element method with high degree element shape functions for one-dimensional Helmholtz equation
✍ Carlos E. Cadenas; Javier J. Rojas; Vianey Villamizar 📂 Article 📅 2006 🏛 Elsevier Science 🌐 English ⚖ 740 KB

An application of least squares finite element method (LSFEM) to wave scattering problems governed by the one-dimensional Helmholtz equation is presented. Boundary conditions are included in the variational formulation following Cadenas and Villamizar's previous paper in Cadenas and Villamizar [C. C