Andy Wathen : Publications
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[1]
A Bramble−Pasciak−like method with applications in optimization
H. Sue Dollar‚ Nicholas I. M. Gould‚ Martin Stoll and Andrew J. Wathen
No. NA−08/08. Oxford University Computing Laboratory. June, 2008.
Details about A Bramble−Pasciak−like method with applications in optimization | BibTeX data for A Bramble−Pasciak−like method with applications in optimization | Download (pdf) of A Bramble−Pasciak−like method with applications in optimization
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[2]
A Local Sensitivity Analysis Method for Developing Biological Models with Identifiable Parameters: Application to Cardiac Ionic Channel Modelling
A. Sher‚ K. Wang‚ A. Wathen‚ P.J. Maybank‚ G.R. Mirams‚ D. Abramson‚ D. Noble and D.J. Gavaghan
In Future Generation Computer Systems. Vol. 29. No. 2. Pages 591−598. 2013.
Details about A Local Sensitivity Analysis Method for Developing Biological Models with Identifiable Parameters: Application to Cardiac Ionic Channel Modelling | BibTeX data for A Local Sensitivity Analysis Method for Developing Biological Models with Identifiable Parameters: Application to Cardiac Ionic Channel Modelling | DOI (10.1016/j.future.2011.09.006)
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[3]
A Local Sensitivity Analysis Method for Developing Biological Models with Identifiable Parameters: Application to L−type Calcium Channel Modelling
A. Sher‚ K. Wang‚ A. Wathen‚ G. Mirams‚ D. Abramson and D. Gavaghan
In 2010 IEEE Sixth International Conference on e ??: Science. Pages 176–181. 2010.
Details about A Local Sensitivity Analysis Method for Developing Biological Models with Identifiable Parameters: Application to L−type Calcium Channel Modelling | BibTeX data for A Local Sensitivity Analysis Method for Developing Biological Models with Identifiable Parameters: Application to L−type Calcium Channel Modelling | DOI (10.1109/eScience.2010.56) | Link to A Local Sensitivity Analysis Method for Developing Biological Models with Identifiable Parameters: Application to L−type Calcium Channel Modelling
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[4]
Approximation of the scattering amplitude
Gene H. Golub‚ Martin Stoll and Andy Wathen
No. NA−07/22. Oxford University Computing Laboratory. November, 2007.
Details about Approximation of the scattering amplitude | BibTeX data for Approximation of the scattering amplitude | Download (pdf) of Approximation of the scattering amplitude
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[5]
Chebyshev Semi−iteration in Preconditioning
Tyrone Rees Andrew J. Wathen
No. NA−08/14. Oxford University Computing Laboratory. October, 2008.
Details about Chebyshev Semi−iteration in Preconditioning | BibTeX data for Chebyshev Semi−iteration in Preconditioning | Download (pdf) of Chebyshev Semi−iteration in Preconditioning
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[6]
Combination preconditioning and self−adjointness in non−standard inner products with application to saddle point problems
Martin Stoll and Andy Wathen
No. NA−07/11. Oxford University Computing Laboratory. April, 2007.
Details about Combination preconditioning and self−adjointness in non−standard inner products with application to saddle point problems | BibTeX data for Combination preconditioning and self−adjointness in non−standard inner products with application to saddle point problems | Download (pdf) of Combination preconditioning and self−adjointness in non−standard inner products with application to saddle point problems
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[7]
Local projection finite element stabilization for the generalized Stokes problem
Kamel Nafa and Andrew J Wathen
No. NA−08/17. Oxford University Computing Laboratory. October, 2008.
Details about Local projection finite element stabilization for the generalized Stokes problem | BibTeX data for Local projection finite element stabilization for the generalized Stokes problem | Download (pdf) of Local projection finite element stabilization for the generalized Stokes problem
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[8]
Optimal solvers for PDE−Constrained Optimization
Tyrone Rees‚ H. Sue Dollar and Andrew J. Wathen
No. NA−08/10. Oxford University Computing Laboratory. June, 2008.
Details about Optimal solvers for PDE−Constrained Optimization | BibTeX data for Optimal solvers for PDE−Constrained Optimization | Download (pdf) of Optimal solvers for PDE−Constrained Optimization
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[9]
The Bramble−Pasciak preconditioner for saddle point problems
Martin Stoll and Andy Wathen
No. NA−07/13. Oxford University Computing Laboratory. June, 2007.
Details about The Bramble−Pasciak preconditioner for saddle point problems | BibTeX data for The Bramble−Pasciak preconditioner for saddle point problems | Download (pdf) of The Bramble−Pasciak preconditioner for saddle point problems