David Knezevic : Publications
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[1]
Analysis and Implementation of Numerical Methods for Simulating Dilute Polymeric Fluids
David J. Knezevic
PhD Thesis October, 2008.
Details about Analysis and Implementation of Numerical Methods for Simulating Dilute Polymeric Fluids | BibTeX data for Analysis and Implementation of Numerical Methods for Simulating Dilute Polymeric Fluids | Download (pdf) of Analysis and Implementation of Numerical Methods for Simulating Dilute Polymeric Fluids
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[2]
A deterministic multiscale approach for simulating dilute polymeric fluids
David J. Knezevic and Endre Süli
In Springer Lectures Notes in Computational Mathematics and Engineering‚ Accepted for publication‚ November 2008.. 2008.
Details about A deterministic multiscale approach for simulating dilute polymeric fluids | BibTeX data for A deterministic multiscale approach for simulating dilute polymeric fluids
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[3]
A heterogeneous alternating−direction method for a micro−macro model of dilute polymeric fluids
David J. Knezevic and Endre Süli
In Submitted to M2AN‚ October. 2008.
Details about A heterogeneous alternating−direction method for a micro−macro model of dilute polymeric fluids | BibTeX data for A heterogeneous alternating−direction method for a micro−macro model of dilute polymeric fluids
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[4]
Spectral Galerkin approximation of Fokker−Planck equations with unbounded drift
David J. Knezevic and Endre Süli
In Accepted to M2AN‚ October. 2008.
Details about Spectral Galerkin approximation of Fokker−Planck equations with unbounded drift | BibTeX data for Spectral Galerkin approximation of Fokker−Planck equations with unbounded drift
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[5]
Spectral Galerkin approximation of Fokker−Planck equations with unbounded drift
David J. Knezevic and Endre Süli
No. NA−07/16. Oxford University Computing Laboratory. September, 2007.
Details about Spectral Galerkin approximation of Fokker−Planck equations with unbounded drift | BibTeX data for Spectral Galerkin approximation of Fokker−Planck equations with unbounded drift | Download (pdf) of Spectral Galerkin approximation of Fokker−Planck equations with unbounded drift
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[6]
Adaptive finite element methodology for tumour angiogenesis modelling
J. W. Peterson‚ G. F. Carey‚ D. J. Knezevic and B. T. Murray
In Internat. J. Numer. Methods Engrg.. 2007.
Details about Adaptive finite element methodology for tumour angiogenesis modelling | BibTeX data for Adaptive finite element methodology for tumour angiogenesis modelling