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Displaying 21 – 40 of 307

Rainbow Connectivity of Cacti and of Some Infinite Digraphs

Jesús Alva-Samos, Juan José Montellano-Ballesteros (2017)

Discussiones Mathematicae Graph Theory

An arc-coloured digraph D = (V,A) is said to be rainbow connected if for every pair {u, v} ⊆ V there is a directed uv-path all whose arcs have different colours and a directed vu-path all whose arcs have different colours. The minimum number of colours required to make the digraph D rainbow connected is called the rainbow connection number of D, denoted rc⃗ (D). A cactus is a digraph where each arc belongs to exactly one directed cycle. In this paper we give sharp upper and lower bounds for the...

Rainbow $H$ -factors.

Yuster, Raphael (2006)

The Electronic Journal of Combinatorics [electronic only]

Rainbow $H$ -factors of complete $s$ -uniform $r$ -partite hypergraphs.

Chen, Ailian, Zhang, Fuji, Li, Hao (2008)

The Electronic Journal of Combinatorics [electronic only]

Rainbow Hamiltonian paths and canonically colored subgraphs in infinite complete graphs.

Erdős, Paul, Tuza, Zsolt (1990)

Mathematica Pannonica

Rainbow matching in edge-colored graphs.

LeSaulnier, Timothy D., Stocker, Christopher, Wenger, Paul S., West, Douglas B. (2010)

The Electronic Journal of Combinatorics [electronic only]

Rainbow matchings in $r$ -partite $r$ -graphs.

Aharoni, Ron, Berger, Eli (2009)

The Electronic Journal of Combinatorics [electronic only]

Rainbow numbers for small stars with one edge added

Izolda Gorgol, Ewa Łazuka (2010)

Discussiones Mathematicae Graph Theory

A subgraph of an edge-colored graph is rainbow if all of its edges have different colors. For a graph H and a positive integer n, the anti-Ramsey number f(n,H) is the maximum number of colors in an edge-coloring of Kₙ with no rainbow copy of H. The rainbow number rb(n,H) is the minimum number of colors such that any edge-coloring of Kₙ with rb(n,H) number of colors contains a rainbow copy of H. Certainly rb(n,H) = f(n,H) + 1. Anti-Ramsey numbers were introduced by Erdös et al. [5] and studied in...

Rainbow paths with prescribed ends.

Alishahi, Meysam, Taherkhani, Ali, Thomassen, Carsten (2011)

The Electronic Journal of Combinatorics [electronic only]

Rainbow Ramsey theory.

Jungić, Veselin, Nešetřil, Jaroslav, Radoičić, Radoš (2005)

Integers

Rainbow Tetrahedra in Cayley Graphs

Italo J. Dejter (2015)

Discussiones Mathematicae Graph Theory

Let Γn be the complete undirected Cayley graph of the odd cyclic group Zn. Connected graphs whose vertices are rainbow tetrahedra in Γn are studied, with any two such vertices adjacent if and only if they share (as tetrahedra) precisely two distinct triangles. This yields graphs G of largest degree 6, asymptotic diameter |V (G)|1/3 and almost all vertices with degree: (a) 6 in G; (b) 4 in exactly six connected subgraphs of the (3, 6, 3, 6)-semi- regular tessellation; and (c) 3 in exactly four connected...

Ramanujan grammar and Cayley trees. (Grammaire de Ramanujan et arbres de Cayley.)

Dumont, Dominique, Ramamonjisoa, Armand (1996)

The Electronic Journal of Combinatorics [electronic only]

Ramanujan type congruences for a partition function.

Zhao, Haijian, Zhong, Zheyuan (2011)

The Electronic Journal of Combinatorics [electronic only]

Ramanujan's method in $q$ -series congruences.

Andrews, George E., Roy, Ranjan (1997)

The Electronic Journal of Combinatorics [electronic only]

Ramified Sets Of Pseudotrees

Đuro Kurepa (1977)

Publications de l'Institut Mathématique

Ramified sets or pseudotrees.

D. Kurepa (1977)

Publications de l'Institut Mathématique [Elektronische Ressource]

Ramsey $(K_{1, 2}, K_{3})$ -minimal graphs.

Borowiecki, M., Schiermeyer, I., Sidorowicz, E. (2005)

The Electronic Journal of Combinatorics [electronic only]

Ramsey numbers for trees II

Zhi-Hong Sun (2021)

Czechoslovak Mathematical Journal

Let $r (G_{1}, G_{2})$ be the Ramsey number of the two graphs $G_{1}$ and $G_{2}$ . For $n_{1} \geq n_{2} \geq 1$ let $S (n_{1}, n_{2})$ be the double star given by $V (S (n_{1}, n_{2})) = {v_{0}, v_{1}, ..., v_{n_{1}}, w_{0}$ , $w_{1}, ..., w_{n_{2}}}$ and $E (S (n_{1}, n_{2})) = {v_{0} v_{1}, ..., v_{0} v_{n_{1}}, v_{0} w_{0}, w_{0} w_{1}, ..., w_{0} w_{n_{2}}}$ . We determine $r (K_{1, m - 1},$ $S (n_{1}, ...$

Ramsey partitions and proximity data structures

Manor Mendel, Assaf Naor (2007)

Journal of the European Mathematical Society

This paper addresses two problems lying at the intersection of geometric analysis and theoretical computer science: The non-linear isomorphic Dvoretzky theorem and the design of good approximate distance oracles for large distortion.We introduce the notion of Ramsey partitions of a finite metric space, and show that the existence of good Ramsey partitions implies a solution to the metric Ramsey problem for large distortion (also known as the non-linear version of the isomorphic Dvoretzky theorem,...

Ramsey problems in additive number theory

Béla Bollobás, Paul Erdős, Guoping Jin (1993)

Acta Arithmetica

Ramsey property with respect to filters

Louveau, Alain (1976)

Abstracta. 4th Winter School on Abstract Analysis

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