Herbert Edelsbrunner
Affiliations: | Computer Science | Duke University, Durham, NC |
Area:
Computer Science, Theoretical Mathematics, StatisticsGoogle:
"Herbert Edelsbrunner"Children
Sign in to add trainee| Vijay Natarajan | grad student | 2004 | Duke |
| Yusu Wang | grad student | 2004 | Duke |
| Dmitriy Morozov | grad student | 2008 | Duke |
| Brittany T. Fasy | grad student | 2012 | Duke |
| Salman Parsa | grad student | 2014 | Duke |
| Jie Liang | post-doc | Duke (BME Tree) |
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Publications
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| Edelsbrunner H, Nikitenko A. (2020) Weighted Poisson--Delaunay Mosaics Theory of Probability & Its Applications. 64: 595-614 |
| Edelsbrunner H, Ölsböck K. (2020) Tri-partitions and Bases of an Ordered Complex Discrete and Computational Geometry. 1-17 |
| Edelsbrunner H, Nikitenko A. (2019) Poisson-Delaunay Mosaics of Order . Discrete & Computational Geometry. 62: 865-878 |
| Edelsbrunner H, Ölsböck K. (2019) Holes and dependences in an ordered complex Computer Aided Geometric Design. 73: 1-15 |
| Edelsbrunner H, Nikitenko A. (2018) Random inscribed polytopes have similar radius functions as Poisson–Delaunay mosaics The Annals of Applied Probability. 28: 3215-3238 |
| Edelsbrunner H, Iglesias-Ham M. (2018) Multiple covers with balls I: Inclusion–exclusion Computational Geometry. 68: 119-133 |
| Edelsbrunner H, Nikitenko A, Reitzner M. (2017) Expected sizes of Poisson–Delaunay mosaics and their discrete Morse functions Advances in Applied Probability. 49: 745-767 |
| Bauer U, Edelsbrunner H. (2016) The Morse theory of Čech and Delaunay complexes Transactions of the American Mathematical Society. 369: 3741-3762 |
| Edelsbrunner H, Iglesias-Ham M. (2016) Multiple Covers with Balls II: Weighted Averages Electronic Notes in Discrete Mathematics. 54: 169-174 |
| Edelsbrunner H, Pausinger F. (2016) Approximation and convergence of the intrinsic volume Advances in Mathematics. 287: 674-703 |