M
Manil Suri
Researcher at University of Maryland, Baltimore County
Publications - 51
Citations - 3208
Manil Suri is an academic researcher from University of Maryland, Baltimore County. The author has contributed to research in topics: Finite element method & Numerical analysis. The author has an hindex of 25, co-authored 50 publications receiving 3024 citations. Previous affiliations of Manil Suri include University of Maryland, College Park.
Papers
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The $h-p$ version of the finite element method with quasiuniform meshes
Ivo Babuška,Manil Suri +1 more
TL;DR: In this paper, the classical error estimates for the h-version of the finite element method are extended for the H-p version, expressed as explicit functions of h and p. The estimates are given for the case where the solution u (H sub k) has singularities at the corners of the domain.
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The P and H-P versions of the finite element method, basic principles and properties
Ivo Babuška,Manil Suri +1 more
TL;DR: In the classical form of the finite element method called the hversion, piecewise polynomials of fixed degree p are used and the mesh size h is decreased for accuracy as discussed by the authors.
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The optimal convergence rate of the p-version of the finite element method
Ivo Babuška,Manil Suri +1 more
TL;DR: In this article, the p-version of the finite element method in two dimensions was shown to be optimal for the case of singularities induced by the corners of the domain and nonhomogenous essential boundary conditions.
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Locking effects in the finite element approximation of elasticity problems
Ivo Babuška,Manil Suri +1 more
TL;DR: In this article, the authors considered the finite element approximation of the 2D elasticity problem when the Poisson ratiov is close to 0.5 and characterized the strength of the locking and robustness of various h-version schemes using triangular and rectangular elements.
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On locking and robustness in the finite element method
Ivo Babuška,Manil Suri +1 more
TL;DR: A numerical scheme for the approximation of a parameter-dependent problem is said to exhibit locking if the accuracy of the approximations deteriorates as the parameter tends to a limiting value as mentioned in this paper.