「Combinatorics」の共起表現一覧(1語右で並び替え)
該当件数 : 70件
| In polyhedral | combinatorics, a branch of mathematics, Steinitz's theor |
| They play an important role in polyhedral | combinatorics: according to the Upper Bound Conjecture, |
| Census of Colorings, Journal of Algebraic | Combinatorics: An International Journal, Volume 1, Issue |
| In geometry and | combinatorics, an arrangement of hyperplanes is a finite |
| In 2004, the Institute of | Combinatorics and its Applications named Colbourn as tha |
| ublished several important results in both | combinatorics and number theory. |
| ouble description" algorithm of polyhedral | combinatorics and computational geometry. |
| heorem: Lectures on Topological Methods in | Combinatorics and Geometry. |
| Faudree specializes in | combinatorics, and specifically in graph theory and Rams |
| Graph Theory and the Electronic Journal of | Combinatorics, and editor of Combinatorica, the Journal |
| ian-Canadian mathematician specializing in | combinatorics and graph theory. |
| utstanding problems, using techniques from | combinatorics and probability theory (especially stoppin |
| r articles on q-series, special functions, | combinatorics and applications. |
| adian mathematician, expert in statistics, | combinatorics and graph theory. |
| k is mostly in the areas of number theory, | combinatorics and discrete geometry, including graph the |
| including foundation work in the fields of | combinatorics and graph theory. |
| e was elected a Fellow of the Institute of | Combinatorics and its Applications (1995) and a Fellow o |
| Sanders received his Ph.D. in algorithms, | combinatorics, and optimization from Georgia Tech in 199 |
| ecognized as one of the modern founders of | combinatorics and graph theory. |
| and a Founding Fellow of the Institute of | Combinatorics and its Applications. |
| ), and the Euler Medal of the Institute of | Combinatorics and its Applications (1999). |
| ebra of two dimensions with matrices, some | combinatorics, and a little statistics. |
| Godsil is a professor at the Department of | Combinatorics and Optimization in the faculty of mathema |
| in the areas of modular forms, partitions, | combinatorics and number theory. |
| e renown of the University's Department of | Combinatorics and Optimization. |
| ce, the Journal of Automata, Languages and | Combinatorics, and of Theoretical Computer Science. |
| An incidence matrix in | combinatorics and finite geometry has ones to indicate i |
| t of 32 listed in discrete mathematics and | combinatorics, and is in the second of four tiers out of |
| , is a founding fellow of the Institute of | Combinatorics and its Applications, and has an Erdos num |
| In | combinatorics and order-theoretic mathematics, a multitr |
| Shrikhande's specialty was | combinatorics, and statistical designs. |
| He started the Journal of Algebraic | Combinatorics, and was the Editor-in-Chief of the Electr |
| Issue: Journal of Automata, Languages and | Combinatorics, announced (as of January 2009) |
| His research interest is | combinatorics, as well as the related areas of algebra, |
| rofessor of Pure Mathematics, specifically | combinatorics, at the University of Cambridge. |
| In graph theory and | combinatorics, both fields within mathematics, a matchin |
| A similar problem also appears in | combinatorics, complexity theory, cryptography and appli |
| mp, students are taught in the branches of | combinatorics, computer game theory, advanced algorithms |
| of mathematics, including automata theory, | combinatorics, discrete geometry, dynamical systems, gro |
| harmonic analysis, analytic number theory, | combinatorics, ergodic theory, partial differential equa |
| In additive | combinatorics, Folkman's theorem states that for each as |
| decompositions of complete graphs and also | combinatorics games. |
| esearch ranges across the subject areas of | combinatorics, graph theory, discrete geometry, and numb |
| Combinatorics, Graph Theory, and Computing. | |
| He specialises in algebra and | combinatorics; he has written books about combinatorics, |
| In mathematical programming and polyhedral | combinatorics, Hirsch's conjecture states that the edge- |
| Pierre Cartier and Dominique Foata for its | combinatorics in the 1960s, trace theory was first formu |
| re heavily involved in the applications of | combinatorics in statistical design, communications theo |
| His work in | combinatorics includes an important paper of 1943 on pro |
| s of mathematics within the broad field of | combinatorics, including random graphs, percolation, ext |
| - Number theory, ChT - Chaos theory, Com - | Combinatorics, Inf - Information theory, Ana - Mathemati |
| which occasionally appears in estimates in | combinatorics, is defined by |
| In mathematics, Milliken's tree theorem in | combinatorics is a partition theorem generalizing Ramsey |
| on of the inversion formula more useful in | combinatorics is as follows: suppose F(x) and G(x) are c |
| Extremal | combinatorics is a field of combinatorics, which is itse |
| In | combinatorics, Janson has publications in probabilistic |
| Algorithmic | Combinatorics, Macmillan, 1973. |
| papers in graph theory and other areas of | combinatorics, many of them in collaboration with other |
| Berge, C. (1989), Hypergraphs, | Combinatorics of Finite sets, Amsterdam: North-Holland, |
| Combinatorics of Coxeter Groups (with F. Brenti), Gradua | |
| s numerous contributions to number theory, | combinatorics, probability, set theory and mathematical |
| ch on UNIVAC (this was one of the earliest | combinatorics problems solved on a digital computer). |
| ker (by both the Logic and Foundations and | Combinatorics sections) at the Combinatorics session of |
| Extremal | combinatorics studies how large or how small a collectio |
| ned out to be an important early result in | combinatorics, supporting the idea that within some suff |
| In algebraic | combinatorics, the Kruskal-Katona theorem gives a comple |
| athematics, particularly matrix theory and | combinatorics, the Pascal matrix is an infinite matrix c |
| In algebraic | combinatorics, the h-vector of a simplicial polytope is |
| In | combinatorics, the Dinitz conjecture is a statement abou |
| Count me in - | Combinatorics: The Art of Counting (1993) |
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