Bibliografias temáticas / Complexe of oriented matroids / Artigos de revistas

Artigos de revistas sobre o tema "Complexe of oriented matroids"

Siga este link para ver outros tipos de publicações sobre o tema: Complexe of oriented matroids.
Autor: Grafiati
Publicado: 25 de maio de 2024

Crie uma referência precisa em APA, MLA, Chicago, Harvard, e outros estilos

Selecione um tipo de fonte:

Veja os 50 melhores artigos de revistas para estudos sobre o assunto "Complexe of oriented matroids".

Ao lado de cada fonte na lista de referências, há um botão "Adicionar à bibliografia". Clique e geraremos automaticamente a citação bibliográfica do trabalho escolhido no estilo de citação de que você precisa: APA, MLA, Harvard, Chicago, Vancouver, etc.

Você também pode baixar o texto completo da publicação científica em formato .pdf e ler o resumo do trabalho online se estiver presente nos metadados.

Veja os artigos de revistas das mais diversas áreas científicas e compile uma bibliografia correta.

1

Mücksch, Paul. "Modular flats of oriented matroids and poset quasi-fibrations". Transactions of the American Mathematical Society, Series B 11, n.º 9 (30 de janeiro de 2024): 306–28. http://dx.doi.org/10.1090/btran/168.

Texto completo da fonte
Resumo:
We study the combinatorics of modular flats of oriented matroids and the topological consequences for their Salvetti complexes. We show that the natural map to the localized Salvetti complex at a modular flat of corank one is what we call a poset quasi-fibration – a notion derived from Quillen’s fundamental Theorem B from algebraic K K -theory. As a direct consequence, the Salvetti complex of an oriented matroid whose geometric lattice is supersolvable is a K ( π , 1 ) K(\pi ,1) -space – a generalization of the classical result for supersolvable hyperplane arrangements due to Falk, Randell and Terao. Furthermore, the fundamental group of the Salvetti complex of a supersolvable oriented matroid is an iterated semidirect product of finitely generated free groups – analogous to the realizable case. Our main tools are discrete Morse theory, the shellability of certain subcomplexes of the covector complex of an oriented matroid, a nice combinatorial decomposition of poset fibers of the localization map, and an isomorphism of covector posets associated to modular elements. We provide a simple construction of supersolvable oriented matroids. This gives many non-realizable supersolvable oriented matroids and by our main result aspherical CW-complexes.
Estilos ABNT, Harvard, Vancouver, APA, etc.
2

Chepoi, Victor, Kolja Knauer e Manon Philibert. "Ample Completions of Oriented Matroids and Complexes of Uniform Oriented Matroids". SIAM Journal on Discrete Mathematics 36, n.º 1 (24 de fevereiro de 2022): 509–35. http://dx.doi.org/10.1137/20m1355434.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
3

Bandelt, Hans-Jürgen, Victor Chepoi e Kolja Knauer. "COMs: Complexes of oriented matroids". Journal of Combinatorial Theory, Series A 156 (maio de 2018): 195–237. http://dx.doi.org/10.1016/j.jcta.2018.01.002.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
4

Webster, Julian. "Cell complexes, oriented matroids and digital geometry". Theoretical Computer Science 305, n.º 1-3 (agosto de 2003): 491–502. http://dx.doi.org/10.1016/s0304-3975(02)00712-0.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
5

Fukuda, Komei, Hiroyuki Miyata e Sonoko Moriyama. "Complete Enumeration of Small Realizable Oriented Matroids". Discrete & Computational Geometry 49, n.º 2 (19 de dezembro de 2012): 359–81. http://dx.doi.org/10.1007/s00454-012-9470-0.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
6

Knauer, Kolja, e Tilen Marc. "On Tope Graphs of Complexes of Oriented Matroids". Discrete & Computational Geometry 63, n.º 2 (11 de julho de 2019): 377–417. http://dx.doi.org/10.1007/s00454-019-00111-z.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
7

Bokowski, Jürgen, e Tomaž Pisanski. "Oriented matroids and complete-graph embeddings on surfaces". Journal of Combinatorial Theory, Series A 114, n.º 1 (janeiro de 2007): 1–19. http://dx.doi.org/10.1016/j.jcta.2006.06.012.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
8

Naimi, Ramin, e Elena Pavelescu. "Linear embeddings of K9 are triple linked". Journal of Knot Theory and Its Ramifications 23, n.º 03 (março de 2014): 1420001. http://dx.doi.org/10.1142/s0218216514200016.

Texto completo da fonte
Resumo:
We use the theory of oriented matroids to show that any linear embedding of K9, the complete graph on nine vertices, into 3-space contains a non-split link with three components. This shows that Sachs' conjecture on linear, linkless embeddings of graphs, whether true or false, does not extend to 3-links.
Estilos ABNT, Harvard, Vancouver, APA, etc.
9

Alfonsín, J. L. Ramírez. "On Linked Spatial Representations". Journal of Knot Theory and Its Ramifications 10, n.º 01 (fevereiro de 2001): 143–50. http://dx.doi.org/10.1142/s0218216501000780.

Texto completo da fonte
Resumo:
What is the smallest positive integer m=m(L) such that every linear spatial representation of the complete graph with n vertices, n≥m contain cycles isotopic to link L? In this paper, we show that [Formula: see text]. The proof uses the well-known cyclic polytope and its combinatorial description in terms of oriented matroids.
Estilos ABNT, Harvard, Vancouver, APA, etc.
10

Welsh, D. J. A. "ORIENTED MATROIDS". Bulletin of the London Mathematical Society 27, n.º 5 (setembro de 1995): 499–501. http://dx.doi.org/10.1112/blms/27.5.499.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
11

Booth, Richard F., Alexandre V. Borovik, Israel M. Gelfand e Neil White. "Oriented Lagrangian Matroids". European Journal of Combinatorics 22, n.º 5 (julho de 2001): 639–56. http://dx.doi.org/10.1006/eujc.2000.0485.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
12

Bokowski, Jürgen, António Guedes de Oliveira e Jürgen Richter-Gebert. "Algebraic varieties characterizing matroids and oriented matroids". Advances in Mathematics 87, n.º 2 (junho de 1991): 160–85. http://dx.doi.org/10.1016/0001-8708(91)90070-n.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
13

Delucchi, Emanuele. "Modular elimination in matroids and oriented matroids". European Journal of Combinatorics 32, n.º 3 (abril de 2011): 339–43. http://dx.doi.org/10.1016/j.ejc.2010.10.013.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
14

Wenzel, Walter. "Book Review: Oriented matroids". Bulletin of the American Mathematical Society 31, n.º 2 (1 de outubro de 1994): 296–98. http://dx.doi.org/10.1090/s0273-0979-1994-00536-1.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
15

Bachem, A., e W. Kern. "Adjoints of oriented matroids". Combinatorica 6, n.º 4 (dezembro de 1986): 299–308. http://dx.doi.org/10.1007/bf02579255.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
16

Fenton, William E. "Completeness in oriented matroids". Discrete Mathematics 66, n.º 1-2 (agosto de 1987): 79–89. http://dx.doi.org/10.1016/0012-365x(87)90120-8.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
17

McLennan, Andrew, e Rabee Tourky. "Games in oriented matroids". Journal of Mathematical Economics 44, n.º 7-8 (julho de 2008): 807–21. http://dx.doi.org/10.1016/j.jmateco.2007.07.003.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
18

Santos, Francisco. "Triangulations of oriented matroids". Memoirs of the American Mathematical Society 156, n.º 741 (2002): 0. http://dx.doi.org/10.1090/memo/0741.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
19

Sturmfels, Bernd, Alexander Postnikov e Isabella Novik. "Syzygies of oriented matroids". Duke Mathematical Journal 111, n.º 2 (fevereiro de 2002): 287–317. http://dx.doi.org/10.1215/s0012-7094-02-11124-7.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
20

Richter-Gebert, Jürgen. "Two interesting oriented matroids". Documenta Mathematica 1 (1996): 137–48. http://dx.doi.org/10.4171/dm/7.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
21

Hochstättler, Winfried, e Robert Nickel. "Joins of oriented matroids". European Journal of Combinatorics 32, n.º 6 (agosto de 2011): 841–52. http://dx.doi.org/10.1016/j.ejc.2011.02.005.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
22

Borovik, Alexandre V., Israel Gelfand e Neil White. "On exchange properties for Coxeter matroids and oriented matroids". Discrete Mathematics 179, n.º 1-3 (janeiro de 1998): 59–72. http://dx.doi.org/10.1016/s0012-365x(96)00027-1.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
23

Bokowski, J., e A. G. Deoliveira. "Invariant Theory-like Theorems for Matroids and Oriented Matroids". Advances in Mathematics 109, n.º 1 (novembro de 1994): 34–44. http://dx.doi.org/10.1006/aima.1994.1078.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
24

Ardila, Federico, Felipe Rincón e Lauren Williams. "Positively oriented matroids are realizable". Journal of the European Mathematical Society 19, n.º 3 (2017): 815–33. http://dx.doi.org/10.4171/jems/680.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
25

Fukuda, Komei, e Tamas Terlaky. "LINEAR COMPLEMENTARITY AND ORIENTED MATROIDS". Journal of the Operations Research Society of Japan 35, n.º 1 (1992): 45–61. http://dx.doi.org/10.15807/jorsj.35.45.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
26

Bachem, Achim, e Walter Kern. "Extension Equivalence of Oriented Matroids". European Journal of Combinatorics 7, n.º 3 (julho de 1986): 193–97. http://dx.doi.org/10.1016/s0195-6698(86)80020-8.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
27

Sturmfels, Bernd. "Neighborly Polytopes and Oriented Matroids". European Journal of Combinatorics 9, n.º 6 (novembro de 1988): 537–46. http://dx.doi.org/10.1016/s0195-6698(88)80050-7.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
28

Bachem, Achim, e Alfred Wanka. "Separation theorems for oriented matroids". Discrete Mathematics 70, n.º 3 (agosto de 1988): 303–10. http://dx.doi.org/10.1016/0012-365x(88)90006-4.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
29

Fukuda, Komei, e Keiichi Handa. "Antipodal graphs and oriented matroids". Discrete Mathematics 111, n.º 1-3 (fevereiro de 1993): 245–56. http://dx.doi.org/10.1016/0012-365x(93)90159-q.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
30

Sturmfels, Bernd, e Günter M. Ziegler. "Extension spaces of oriented matroids". Discrete & Computational Geometry 10, n.º 1 (julho de 1993): 23–45. http://dx.doi.org/10.1007/bf02573961.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
31

Richter-Gebert, Jürgen. "Oriented matroids with few mutations". Discrete & Computational Geometry 10, n.º 3 (setembro de 1993): 251–69. http://dx.doi.org/10.1007/bf02573980.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
32

Miller, Douglas A. "Oriented matroids from smooth manifolds". Journal of Combinatorial Theory, Series B 43, n.º 2 (outubro de 1987): 173–86. http://dx.doi.org/10.1016/0095-8956(87)90020-7.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
33

Abello e Kumar. "Visibility Graphs and Oriented Matroids". Discrete & Computational Geometry 28, n.º 4 (novembro de 2002): 449–65. http://dx.doi.org/10.1007/s00454-002-2881-6.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
34

Lawrence, Jim. "Oriented Matroids and Associated Valuations". Discrete & Computational Geometry 33, n.º 3 (16 de novembro de 2004): 445–62. http://dx.doi.org/10.1007/s00454-004-1114-6.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
35

Lawrence, J. "Mutation Polynomials and Oriented Matroids". Discrete & Computational Geometry 24, n.º 2 (setembro de 2000): 365–90. http://dx.doi.org/10.1007/s004540010042.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
36

Cordovil, Raul, e Komei Fukuda. "Oriented Matroids and Combinatorial Manifolds". European Journal of Combinatorics 14, n.º 1 (janeiro de 1993): 9–15. http://dx.doi.org/10.1006/eujc.1993.1002.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
37

Cordovil, Raul, e Pierre Duchet. "Cyclic Polytopes and Oriented Matroids". European Journal of Combinatorics 21, n.º 1 (janeiro de 2000): 49–64. http://dx.doi.org/10.1006/eujc.1999.0317.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
38

Anderson, Laura, e Rephael Wenger. "Oriented Matroids and Hyperplane Transversals". Advances in Mathematics 119, n.º 1 (abril de 1996): 117–25. http://dx.doi.org/10.1006/aima.1996.0028.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
39

Roudneff, J. P. "Inseparability graphs of oriented matroids". Combinatorica 9, n.º 1 (março de 1989): 75–84. http://dx.doi.org/10.1007/bf02122686.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
40

Guzmán-Pro, Santiago, e Winfried Hochstättler. "Oriented cobicircular matroids are GSP". Discrete Mathematics 347, n.º 1 (janeiro de 2024): 113686. http://dx.doi.org/10.1016/j.disc.2023.113686.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
41

Chen, Xiangying. "An Axiomatization of Matroids and Oriented Matroids as Conditional Independence Models". SIAM Journal on Discrete Mathematics 38, n.º 2 (17 de maio de 2024): 1526–36. http://dx.doi.org/10.1137/23m1558653.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
42

Živaljević, Rade T. "Oriented matroids and Ky Fan’s theorem". Combinatorica 30, n.º 4 (julho de 2010): 471–84. http://dx.doi.org/10.1007/s00493-010-2446-x.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
43

Hartmann, Mark, e Michael H. Schneider. "Max-balanced flows in oriented matroids". Discrete Mathematics 137, n.º 1-3 (janeiro de 1995): 223–40. http://dx.doi.org/10.1016/0012-365x(93)e0168-4.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
44

Cordovil, R., e M. L. Moreira. "A homotopy theorem on oriented matroids". Discrete Mathematics 111, n.º 1-3 (fevereiro de 1993): 131–36. http://dx.doi.org/10.1016/0012-365x(93)90149-n.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
45

Bokowski, Jürgen, e Bernd Sturmfels. "On the coordinatization of oriented matroids". Discrete & Computational Geometry 1, n.º 4 (dezembro de 1986): 293–306. http://dx.doi.org/10.1007/bf02187702.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
46

Miyata, Hiroyuki, e Arnau Padrol. "Enumerating Neighborly Polytopes and Oriented Matroids". Experimental Mathematics 24, n.º 4 (24 de julho de 2015): 489–505. http://dx.doi.org/10.1080/10586458.2015.1015084.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
47

Cordovil, R. "A Commutative Algebra for Oriented Matroids". Discrete & Computational Geometry 27, n.º 1 (janeiro de 2002): 73–84. http://dx.doi.org/10.1007/s00454-001-0053-8.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
48

Rambau, J. "Circuit Admissible Triangulations of Oriented Matroids". Discrete & Computational Geometry 27, n.º 1 (janeiro de 2002): 155–61. http://dx.doi.org/10.1007/s00454-001-0058-3.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
49

Buchi, J. Richard, e William E. Fenton. "Large convex sets in oriented matroids". Journal of Combinatorial Theory, Series B 45, n.º 3 (dezembro de 1988): 293–304. http://dx.doi.org/10.1016/0095-8956(88)90074-3.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
50

Las Vergnas, Michel. "Acyclic reorientations of weakly oriented matroids". Journal of Combinatorial Theory, Series B 49, n.º 2 (agosto de 1990): 195–99. http://dx.doi.org/10.1016/0095-8956(90)90027-w.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
Oferecemos descontos em todos os planos premium para autores cujas obras estão incluídas em seleções literárias temáticas. Contate-nos para obter um código promocional único!

Vá para a bibliografia