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Items submitted by Stefan Güttel

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Number of items submitted by this user: 46

2012.88: Stefan Güttel and Leonid Knizhnerman (2012) A black-box rational Arnoldi variant for Cauchy-Stieltjes matrix functions.

2012.113: Elias Jarlebring and Stefan Güttel (2012) A spatially adaptive iterative method for a class of nonlinear operator eigenproblems.

2013.28: Stefan Güttel and Georges Klein (2013) Efficient high-order rational integration and deferred correction with equispaced data.

2012.113: Elias Jarlebring and Stefan Güttel (2012) A spatially adaptive iterative method for a class of nonlinear operator eigenproblems.

2013.48: Andreas Frommer, Stefan Güttel and Marcel Schweitzer (2013) Efficient and stable Arnoldi restarts for matrix functions based on quadrature.

2013.49: Stefan Güttel, Roel Van Beeumen, Karl Meerbergen and Wim Michiels (2013) NLEIGS: A class of robust fully rational Krylov methods for nonlinear eigenvalue problems.

2013.53: Vladimir Druskin, Stefan Güttel and Leonid Knizhnerman (2013) Near-optimal perfectly matched layers for indefinite Helmholtz problems.

2012.113: Elias Jarlebring and Stefan Güttel (2012) A spatially adaptive iterative method for a class of nonlinear operator eigenproblems.

2013.83: Stefan Güttel and Jen Pestana (2013) Some observations on weighted GMRES.

2013.48: Andreas Frommer, Stefan Güttel and Marcel Schweitzer (2013) Efficient and stable Arnoldi restarts for matrix functions based on quadrature.

2013.53: Vladimir Druskin, Stefan Güttel and Leonid Knizhnerman (2013) Near-optimal perfectly matched layers for indefinite Helmholtz problems.

2013.48: Andreas Frommer, Stefan Güttel and Marcel Schweitzer (2013) Efficient and stable Arnoldi restarts for matrix functions based on quadrature.

2014.28: Frommer Andreas, Güttel Stefan and Schweitzer Marcel (2014) Convergence of restarted Krylov subspace methods for Stieltjes functions of matrices.

2014.36: Ralph-Uwe Börner, Oliver G. Ernst and Stefan Güttel (2014) Three-Dimensional Transient Electromagnetic Modeling Using Rational Krylov Methods.

2014.36: Ralph-Uwe Börner, Oliver G. Ernst and Stefan Güttel (2014) Three-Dimensional Transient Electromagnetic Modeling Using Rational Krylov Methods.

2014.39: Stefan Güttel, Eric Polizzi, Peter Tang and Gautier Viaud (2014) Zolotarev quadrature rules and load balancing for the FEAST eigensolver.

2014.28: Frommer Andreas, Güttel Stefan and Schweitzer Marcel (2014) Convergence of restarted Krylov subspace methods for Stieltjes functions of matrices.

2014.51: T D Butters, S Güttel, J L Shapiro and T J Sharpe (2014) Statistical cluster analysis and visualisation for alarm management configuration.

2014.56: Mario Berljafa and Stefan Güttel (2014) A Rational Krylov Toolbox for MATLAB.

2014.59: Mario Berljafa and Stefan Güttel (2014) Generalized rational Krylov decompositions with an application to rational approximation.

2014.56: Mario Berljafa and Stefan Güttel (2014) A Rational Krylov Toolbox for MATLAB.

2014.56: Mario Berljafa and Stefan Güttel (2014) A Rational Krylov Toolbox for MATLAB.

2014.36: Ralph-Uwe Börner, Oliver G. Ernst and Stefan Güttel (2014) Three-Dimensional Transient Electromagnetic Modeling Using Rational Krylov Methods.

2013.53: Vladimir Druskin, Stefan Güttel and Leonid Knizhnerman (2013) Near-optimal perfectly matched layers for indefinite Helmholtz problems.

2015.16: Frommer Andreas, Güttel Stefan and Schweitzer Marcel (2015) FUNM_QUAD: An implementation of a stable quadrature-based restarted Arnoldi method for matrix functions.

2015.19: Timothy D. Butters, Stefan Güttel and Jonathan L. Shapiro (2015) Detecting and Reducing Redundancy in Alarm Networks.

2014.39: Stefan Güttel, Eric Polizzi, Peter Tang and Gautier Viaud (2014) Zolotarev quadrature rules and load balancing for the FEAST eigensolver.

2014.59: Mario Berljafa and Stefan Güttel (2014) Generalized rational Krylov decompositions with an application to rational approximation.

2015.34: Stefan Güttel (2006) Convergence Estimates of Krylov Subspace Methods for the Approximation of Matrix Functions Using Tools from Potential Theory. Masters thesis, Technische Universität Bergakademie Freiberg.

2015.19: Timothy D. Butters, Stefan Güttel and Jonathan L. Shapiro (2015) Detecting and Reducing Redundancy in Alarm Networks.

2015.38: Mario Berljafa and Stefan Güttel (2015) The RKFIT algorithm for nonlinear rational approximation.

2015.46: Stefan Güttel and Nakatsukasa Yuji (2015) Scaled and squared subdiagonal Padé approximation for the matrix exponential.

2015.86: T D Butters, S Güttel, J L Shapiro and T J Sharpe (2015) Automatic real-time fault detection for industrial assets using metasensors.

2014.56: Mario Berljafa and Stefan Güttel (2014) A Rational Krylov Toolbox for MATLAB.

2016.11: Stefan Güttel and John W. Pearson (2016) A rational deferred correction approach to PDE-constrained optimization.

2013.53: Vladimir Druskin, Stefan Güttel and Leonid Knizhnerman (2016) Near-optimal perfectly matched layers for indefinite Helmholtz problems. SIAM Review, 58 (1). pp. 90-116. ISSN 1095-7200

2016.32: Mario Berljafa and Stefan Güttel (2016) Parallelization of the rational Arnoldi algorithm.

2016.32: Mario Berljafa and Stefan Güttel (2016) Parallelization of the rational Arnoldi algorithm.

2016.11: Stefan Güttel and John W. Pearson (2016) A rational deferred correction approach to PDE-constrained optimization.

2016.53: Vladimir Druskin, Stefan Güttel and Leonid Knizhnerman (2016) Compressing variable-coefficient exterior Helmholtz problems via RKFIT.

2016.53: Vladimir Druskin, Stefan Güttel and Leonid Knizhnerman (2016) Compressing variable-coefficient exterior Helmholtz problems via RKFIT.

2015.38: Mario Berljafa and Stefan Güttel (2015) The RKFIT algorithm for nonlinear rational approximation.

2017.7: Stefan Güttel and Françoise Tisseur (2017) The Nonlinear Eigenvalue Problem.

2017.7: Stefan Güttel and Françoise Tisseur (2017) The Nonlinear Eigenvalue Problem.

2017.17: Martin J. Gander, Stefan Güttel and Madalina Petcu (2017) A Nonlinear ParaExp Algorithm.

2016.11: Stefan Güttel and John W. Pearson (2016) A rational deferred correction approach to parabolic optimal control problems.