Matthias Koppe
Affiliations: | Applied Mathematics | University of California, Davis, Davis, CA |
Area:
Applied Mathematics, Mathematics, Operations ResearchGoogle:
"Matthias Koppe"
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Publications
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| Köppe M, Zhou Y. (2020) Facets, weak facets, and extreme functions of the Gomory–Johnson infinite group problem Mathematical Programming. 1-58 |
| Köppe M, Wang J. (2019) Dual-feasible functions for integer programming and combinatorial optimization: Algorithms, characterizations, and approximations Discrete Applied Mathematics |
| Hong CY, Köppe M, Zhou Y. (2018) Equivariant perturbation in Gomory and Johnson's infinite group problem (V). Software for the continuous and discontinuous 1-row case Optimization Methods & Software. 33: 475-498 |
| Köppe M, Zhou Y. (2018) Equivariant perturbation in Gomory and Johnson’s infinite group problem. VI. The curious case of two-sided discontinuous minimal valid functions Discrete Optimization. 30: 51-72 |
| Köppe M, Wang J. (2017) Structure and Interpretation of Dual-Feasible Functions Electronic Notes in Discrete Mathematics. 62: 153-158 |
| Köppe M, Zhou Y. (2017) New computer-based search strategies for extreme functions of the Gomory–Johnson infinite group problem Mathematical Programming Computation. 9: 419-469 |
| Gerard D, Köppe M, Louveaux Q. (2017) Guided Dive for the Spatial Branch-and-Bound Journal of Global Optimization. 68: 685-711 |
| Beck M, Braun B, Köppe M, et al. (2016) Generating functions and triangulations for lecture hall cones Siam Journal On Discrete Mathematics. 30: 1470-1479 |
| Baldoni V, Berline N, Loera JAD, et al. (2016) Intermediate Sums On Polyhedra Ii: Bidegree And Poisson Formula Mathematika. 62: 653-684 |
| Basu A, Hildebrand R, Köppe M. (2016) Equivariant perturbation in Gomory and Johnson’s infinite group problem—III: foundations for the k-dimensional case with applications to k=2 Mathematical Programming. 1-58 |