| Endre Boros | |
| Birth Date: | 21 September 1953 |
| Nationality: | Hungarian |
| Fields: | Mathematics |
| Workplaces: | Rutgers University |
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| Known For: | Director of the Center for Operations Research |
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Endre Boros (born 21 September 1953) is a Hungarian-American mathematician, a Distinguished Professor at Rutgers University in New Brunswick, New Jersey, and the Director of the Center for Operations Research (RUTCOR).[1] He is the author of 15 book chapters and edited volumes, and 165 research papers. He is Associate Editor of the Annals of Mathematics and Artificial Intelligence, and Editor-in-Chief of both the Annals of Operations Research and Discrete Applied Mathematics.[2] [3]
settled a conjecture by Beniamino Segre about the cyclic structure of finite projective planes, and provided the best known bound for a question posed by Paul Erdős about blocking sets of Galois planes. proved that perfect graphs are kernel solvable which answered a longstanding open question by C. Berge and P. Duchet (and which is independent of the perfect graph theorem). He settled the complexity of generating all maximal frequent and minimal infrequent sets of large data sets answering questions by R.H. Sloan, K. Takata and G. Turán in, and in resolved the complexity of the longstanding open problem of generating all vertices of polyhedra.
uses a network flow based approach for quadratic binary optimization.In the area of the theory of Horn functions, proved that all "prime implicates" of a Horn CNF can be generated efficiently, extended Horn logic to q-Horn and showed that this extension forms in some sense the boundary between tractable and intractable logic.