F. Alberto Grünbaum
Affiliations: | Mathematics | University of California, Berkeley, Berkeley, CA, United States |
Area:
Analysis, Probability, Integrable systems, Medical imagingGoogle:
"F. Grünbaum"Parents
Sign in to add mentorHenry P. McKean | grad student | 1969 | Rockefeller | |
(Some Mathematical Problems Connected with the Bolzmann Equation) |
Children
Sign in to add traineeRonald Perline | grad student | 1984 | UC Berkeley |
Brandoch H. Calef | grad student | 2002 | UC Berkeley |
Luisa Miranian | grad student | 2005 | UC Berkeley |
Michael Pejic | grad student | 2014 | UC Berkeley |
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Publications
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Grünbaum FA, Pacharoni I, Zurrián I. (2020) Bispectrality and Time-Band-Limiting: Matrix valued polynomials International Mathematics Research Notices. 2020: 4016-4036 |
Casper WR, Grünbaum FA, Yakimov M, et al. (2019) Reflective prolate-spheroidal operators and the KP/KdV equations. Proceedings of the National Academy of Sciences of the United States of America. 116: 18310-18315 |
Grünbaum FA, Iglesia MDdl. (2019) Stochastic Darboux transformations for quasi-birth-and-death processes and urn models Journal of Mathematical Analysis and Applications. 478: 634-654 |
Machida T, Grünbaum FA. (2018) Some limit laws for quantum walks with applications to a version of the Parrondo paradox Quantum Information Processing. 17: 241 |
Grünbaum FA, Vinet L, Zhedanov A. (2018) Algebraic Heun Operator and Band-Time Limiting Communications in Mathematical Physics. 364: 1041-1068 |
Grünbaum FA, Pejic M. (2016) Maximal Parrondo’s Paradox for Classical and Quantum Markov Chains Letters in Mathematical Physics. 106: 251-267 |
Grünbaum FA. (2014) Some noncommutative matrix algebras arising in the bispectral problem Symmetry, Integrability and Geometry: Methods and Applications (Sigma). 10 |
Grünbaum FA, Rahman M. (2011) A System of Multivariable Krawtchouk Polynomials and a Probabilistic Application Symmetry Integrability and Geometry-Methods and Applications. 7: 118 |
Grünbaum FA, Iglesia MDdl, Martínez-Finkelshtein A. (2011) Properties of matrix orthogonal polynomials via their Riemann-Hilbert characterization Symmetry Integrability and Geometry-Methods and Applications. 7: 98 |
Grünbaum FA, Rahman M. (2010) On a family of 2-variable orthogonal Krawtchouk polynomials Symmetry, Integrability and Geometry: Methods and Applications (Sigma). 6 |