Ke Shi's Homepage
Ke is a graduate student of school of Mathematics,
University of
Minnesota. He is working with Prof.
Cockburn on
hybridizable discontinuous Galerkin methods. CV
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| Research Interests: | Numerical Analysis, Discontinuous Galerkin
Methods, Numerical methods for fourth order problems. |
| Mailing Address: | School of
Mathematics University of Minnesota 127 Vincent Hall 206 Church St. S.E. Minneapolis, MN 55455, USA |
| Office Location: | 322 Vincent Hall |
| E-mail Address: | shixx075@umn.edu |
| Phone Number: | (612) 625-3395 |
| Fax Number: | (612) 626-2017 |
Publications
[1]. Hybridizable discontinuous Galerkin methods for Timoshenko beams, J. Sci. Comput. 44 (2010) no.1 pp. 1–37. , with F. Celiker, B. Cockburn. PDF[2]. A Projection-Based error analysis of HDG Methods for Timoshenko Beams, Math. Comp. with F. Celiker, B. Cockburn. To appear PDF
[3]. Conditions for superconvergence of HDG Methods for second-order elliptic problems, Math. Comp. with B. Cockburn, W. Qiu. To appear PDF
[4]. Conditions for superconvergence of HDG Methods for Stokes equations, with B. Cockburn, To appear PDF
Ongoing Projects
[5]. Superconvergent HDG
methods on isoparametric elements for second-order
elliptic problems, with B. Cockburn, W. Qiu,
submitted. PDF[6]. The devising of superconvergent HDG methods for linear elasticity with
weak stress symmetry, with B. Cockburn, in preparation.
[7]. Hybridizable discontinuous Galerkin methods for Biharmonic problems, with F. Celiker, B. Cockburn, in preparation.
Teaching
Links
School of Mathematics
Institute of Technology
University of Minnesota
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Last ModifiedFriday October
08, 2010
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