Rudi Weikard
Affiliations: | Applied Mathematics | University of Alabama, Birmingham, Birmingham, AL, United States |
Area:
Applied MathematicsGoogle:
"Rudi Weikard"Children
Sign in to add trainee| Robert A. Peacock | grad student | 2001 | UAB |
| Rami AlAhmad | grad student | 2010 | UAB |
| Matthew B. Bledsoe | grad student | 2013 | UAB |
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Publications
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| Ghatasheh A, Weikard R. (2020) Spectral theory for systems of ordinary differential equations with distributional coefficients Journal of Differential Equations. 268: 2752-2801 |
| Campbell K, Nguyen M, Weikard R. (2019) On the spectral theory for first-order systems without the unique continuation property Linear & Multilinear Algebra. 1-9 |
| Gesztesy F, Naboko SN, Weikard R, et al. (2019) Donoghue-type m -functions for Schrödinger operators with operator-valued potentials Journal D Analyse Mathematique. 137: 373-427 |
| Ghatasheh A, Weikard R. (2017) On Leighton's comparison theorem Journal of Differential Equations. 262: 5978-5989 |
| Bledsoe M, Weikard R. (2015) The inverse resonance problem for left-definite Sturm-Liouville operators Journal of Mathematical Analysis and Applications. 423: 1753-1773 |
| Gesztesy F, Weikard R. (2014) Some remarks on the spectral problem underlying the camassa-holm hierarchy Operator Theory: Advances and Applications. 240: 137-188 |
| Gesztesy F, Weikard R, Zinchenko M. (2013) Initial value problems and Weyl-Titchmarsh theory for Schrödinger operators with operator-valued potentials Operators and Matrices. 7: 241-283 |
| Alahmad R, Weikard R. (2013) On inverse problems for left-definite discrete Sturm-Liouville equations Operators and Matrices. 7: 35-70 |
| Gesztesy F, Weikard R, Zinchenko M. (2013) On a class of model hilbert spaces Discrete and Continuous Dynamical Systems- Series A. 33: 5067-5088 |
| Gesztesy F, Weikard R, Zinchenko M. (2013) On spectral theory for Schrödinger operators with operator-valued potentials Journal of Differential Equations. 255: 1784-1827 |