ASYMPTOTIC BOUNDS FOR IRREDUNDANT RAMSEY NUMBERS

Abstract

The irredundant Ramsey number s(m,n) is the smallest N such that in every red-blue colouring of the edges of K_N , either the blue graph contains an m-element irredundant set or the red graph contains an n-element irredundant set. We prove an asymptotic lower bound for s(m, n).     

Asymptotic bounds for irredundant and mixed Ramsey numbers

The irredundant Ramsey number s(m, n) is the smallest N such that in every red-blue coloring of the edges of K_N, either the blue graph contains an m-element irredundant set or the red graph contains an n-element irredundant set. The definition of the mixed Ramsey number t(m, n) differs from s(m, n) in that the n-element irredundant set is replaced by an n-element independent set. We prove asymptotic lower bounds for s(n, n) and t(m, n) (with m fixed and n large) and a general upper bound for t(3, n). © 1993 John Wiley & Sons, Inc.     

The irredundant ramsey number s(3, 7)

The irredundant Ramsey number s(m, n) is the smallest p such that for every graph G with p vertices, either G contains an n-element irredundant set or its complement G contains an m-element irredundant set. Cockayne, Hattingh, and Mynhardt have given a computer-assisted proof that s(3, 7) = 18. The purpose of this paper is to give a self-contained proof of this result. © 1995 John Wiley & Sons, Inc.     

The mixed irredundant Ramsey numbers t(3, 7) = 18 and t(3, 8) = 22

Abstract

The mixed irredundant Ramsey number t(m, n) is the smallest natural number t such that if the edges of the complete graph K_t on t vertices are arbitrarily bi-coloured using the colours blue and red, then necessarily either the subgraph induced by the blue edges has an irredundant set of cardinality m or the subgraph induced by the red edges has an independent set of cardinality n (or both). Previously it was known that 18 ≤ t(3, 7) ≤ 22 and 18 ≤ t(3, 8) ≤ 28. In this paper we prove that t(3, 7) = 18 and t(3, 8) = 22.     

Irredundant ramsey numbers for graphs

The irredundant Ramsey number s(m, n) is the least value of p such that for any p-vertex graph G, either G has an irredundant set of at least n vertices or its complement G has an irredundant set of at least m vertices. The existence of these numbers is guaranteed by Ramsey's theorem. We prove that s(3, 3) = 6, s(3, 4) = 8, and s(3,5) = 12.     

Large Kr‐free subgraphs in Ks‐free graphs and some other Ramsey‐type problems

In this paper we present three Ramsey‐type results, which we derive from a simple and yet powerful lemma, proved using probabilistic arguments. Let 3 ≤ r < s be fixed integers and let G be a graph on n vertices not containing a complete graph K_s on s vertices. More than 40 years ago Erd?s and Rogers posed the problem of estimating the maximum size of a subset of G without a copy of the complete graph K_r. Our first result provides a new lower bound for this problem, which improves previous results of various researchers. It also allows us to solve some special cases of a closely related question posed by Erd?s. For two graphs G and H, the Ramsey number R(G, H) is the minimum integer N such that any red‐blue coloring of the edges of the complete graph K_N, contains either a red copy of G or a blue copy of H. The book with n pages is the graph B_n consisting of n triangles sharing one edge. Here we study the book‐complete graph Ramsey numbers and show that R(B_n, K_n) ≤ O(n³/log^3/2n), improving the bound of Li and Rousseau. Finally, motivated by a question of Erd?s, Hajnal, Simonovits, Sós, and Szemerédi, we obtain for all 0 < δ < 2/3 an estimate on the number of edges in a K₄‐free graph of order n which has no independent set of size n^1‐δ. © 2004 Wiley Periodicals, Inc. Random Struct. Alg., 2005     

Lower bounds for lower Ramsey numbers

For any graph G, let i(G) and μ;(G) denote the smallest number of vertices in a maximal independent set and maximal clique, respectively. For positive integers m and n, the lower Ramsey number s(m, n) is the largest integer p so that every graph of order p has i(G) ≤ m or μ;(G) ≤ n. In this paper we give several new lower bounds for s (m, n) as well as determine precisely the values s(1, n).     

CO‐irredundant Ramsey numbers for graphs

The study of the CO‐irredundant Ramsey numbers t(n₁, ···, n_k) is initiated. It is shown that several values and bounds for these numbers may be obtained from the well‐studied generalized graph Ramsey numbers and the values of t(4, 5), t(4, 6) and t(3, 3, m) are calculated. © 2000 John Wiley & Sons, Inc. J Graph Theory 34: 258–268, 2000     

The irredundant ramsey number s(3,3,3) = 13

Let G₁, G₂,. …, G_t be an arbitrary t-edge coloring of K_n, where for each i ∈ {1,2, …, t}, G_i is the spanning subgraph of K_n consisting of all edges colored with the ith color. The irredundant Ramsey number s(q₁, q₂, …, q_t) is defined as the smallest integer n such that for any t-edge coloring of K_n, _i has an irredundant set of size q_i for at least one i ∈ {1,2, …,t}. It is proved that s(3,3,3) = 13, a result that improves the known bounds 12 ≤ s(3,3,3) ≤ 14.     

Some Bipartite Ramsey Numbers

Consider a complete bipartite graph K(s, s) with p = 2s points. Let each line of the graph have either red or blue colour. The smallest number p of points such that K(s, s) always contains red K(m, n) or blue K(m, n) is called bipartite Ramsey number denoted by rb(K(m, n), K(m, n)). In this paper, we show that

On cycle—Complete graph ramsey numbers

A new upper bound is given for the cycle-complete graph Ramsey number r(C_m, K_n), the smallest order for a graph which forces it to contain either a cycle of order m or a set of n independent vertices. Then, another cycle-complete graph Ramsey number is studied, namely r(?C_m, K_n) the smallest order for a graph which forces it to contain either a cycle of order / for some / satisfying 3?/?m or a set of n independent vertices. We obtain the exact value of r(?C_m K_n) for all m > n and an upper bound which applies when m is large in comparison with log n.     

All cycle‐complete graph Ramsey numbers r(Cm,K6)

The cycle‐complete graph Ramsey number r(C_m, K_n) is the smallest integer N such that every graph G of order N contains a cycle C_m on m vertices or has independence number α(G) ≥ n. It has been conjectured by Erd?s, Faudree, Rousseau and Schelp that r(C_m, K_n) = (m ? 1) (n ? 1) + 1 for all m ≥ n ≥ 3 (except r(C₃, K₃) = 6). This conjecture holds for 3 ≤ n ≤ 5. In this paper we will present a proof for n = 6 and for all n ≥ 7 with m ≥ n² ? 2n. © 2003 Wiley Periodicals, Inc. J Graph Theory 44: 251–260, 2003     

The size Ramsey number of trees with bounded degree

The size Ramsey number r?(G, H) of graphs G and H is the smallest integer r? such that there is a graph F with r? edges and if the edge set of F is red-blue colored, there exists either a red copy of G or a blue copy of H in F. This article shows that r?(T_nd, T_nd) ? c · d² · n and c · n³ ? r?(K_n, T_nd) ? c(d)·n³ log n for every tree T_nd on n vertices. and maximal degree at most d and a complete graph K_n on n vertices. A generalization will be given. Probabilistic method is used throught this paper. © 1993 John Wiley Sons, Inc.     

The Ramsey number R(3, t) has order of magnitude t2/log t

The Ramsey number R(s, t) for positive integers s and t is the minimum integer n for which every red-blue coloring of the edges of a complete n-vertex graph induces either a red complete graph of order s or a blue complete graph of order t. This paper proves that R(3, t) is bounded below by (1 – o(1))t/²/log t times a positive constant. Together with the known upper bound of (1 + o(1))t²/log t, it follows that R(3, t) has asymptotic order of magnitude t²/log t. © 1995 John Wiley & Sons, Inc.     

Star-critical Ramsey numbers

The graph Ramsey numberR(G,H) is the smallest integer r such that every 2-coloring of the edges of K_r contains either a red copy of G or a blue copy of H. We find the largest star that can be removed from K_r such that the underlying graph is still forced to have a red G or a blue H. Thus, we introduce the star-critical Ramsey numberr_∗(G,H) as the smallest integer k such that every 2-coloring of the edges of K_r−K_1,r−1−k contains either a red copy of G or a blue copy of H. We find the star-critical Ramsey number for trees versus complete graphs, multiple copies of K₂ and K₃, and paths versus a 4-cycle. In addition to finding the star-critical Ramsey numbers, the critical graphs are classified for R(T_n,K_m), R(nK₂,mK₂) and R(P_n,C₄).     

A Structure Preserving Generalization of Independence,Domination and Irredundance

Abstract

The now famous inequality chain ir≤γ≤i≤β ≤ Γ ≤ IR, where ir and IR denote the lower and upper irredundance numbers of a graph, γ and Γ the lower and upper domination numbers, i the independent domination number and β the independence number of a graph, may be seen as the culmination of a process by which we start with independence (a hereditary property of vertex sets); we characterize maximal independence by domination (a superhereditary property of vertex sets), and then characterize minimal domination by irredundance (again a hereditary property). In this paper we generalize independent, dominating and irredundant sets of a graph G to what we will call s-dominating, s-independent and s-irredundant functions (for s a positive integer), which are functions of the type f : V (G) → N, in such a way that the maximal 1-independent, the minimal 1- dominating and the maximal 1-irredundant functions are the characteristic functions of the maximal independent, the minimal dominating and the maximal irredundant sets of G respectively. In addition, we would want to preserve those properties of and relationships between independence, domination and irredundance needed to extend the inequality chain ir≤γ≤i≤β ≤ Γ ≤ IR to one for s-dominating, s-independent and s-irredundant functions by a process similar to that described above.     

On two problems in graph Ramsey theory

We study two classical problems in graph Ramsey theory, that of determining the Ramsey number of bounded-degree graphs and that of estimating the induced Ramsey number for a graph with a given number of vertices. The Ramsey number r(H) of a graph H is the least positive integer N such that every two-coloring of the edges of the complete graph K _N contains a monochromatic copy of H. A famous result of Chváatal, Rödl, Szemerédi and Trotter states that there exists a constant c(Δ) such that r(H) ≤ c(Δ)n for every graph H with n vertices and maximum degree Δ. The important open question is to determine the constant c(Δ). The best results, both due to Graham, Rödl and Ruciński, state that there are positive constants c and c′ such that $2^{c'\Delta } \leqslant c(\Delta ) \leqslant ^{c\Delta \log ^2 \Delta }$ . We improve this upper bound, showing that there is a constant c for which c(Δ) ≤ 2 ^cΔlogΔ . The induced Ramsey number r _ind (H) of a graph H is the least positive integer N for which there exists a graph G on N vertices such that every two-coloring of the edges of G contains an induced monochromatic copy of H. Erd?s conjectured the existence of a constant c such that, for any graph H on n vertices, r _ind (H) ≤ 2 ^cnlogn . We move a step closer to proving this conjecture, showing that r _ind (H) ≤ 2 ^cnlogn . This improves upon an earlier result of Kohayakawa, Prömel and Rödl by a factor of logn in the exponent.     

The Ramsey number of a graph with bounded maximum degree

The Ramsey number of a graph G is the least number t for which it is true that whenever the edges of the complete graph on t vertices are colored in an arbitrary fashion using two colors, say red and blue, then it is always the case that either the red subgraph contains G or the blue subgraph contains G. A conjecture of P. Erdös and S. Burr is settled in the affirmative by proving that for each d ≥ 1, there exists a constant c so that if G is any graph on n vertices with maximum degree d, then the Ramsey number of G is at most cn.     

Search algorithm for Ramsey graphs by union of group orbits

An algorithm for the construction of Ramsey graphs with a given automorphism group G is presented. To find a graph on n vertices with no clique of k vertices, K_k, and no independent set of l vertices, ¯K_l, k, l ≤ n, with an automorphism group G, a Boolean formula α based on the G-orbits of k-subsets and l-subsets of vertices is constructed from incidence matrices belonging to G. This Boolean formula is satisfiable if and only if the desired graph exists, and each satisfying assignment to α specifies a set of orbits of pairs of vertices whose union gives the edges of such a graph. Finding these assignments is basically equivalent to the conversion of α from CNF to DNF (conjunctive to disjunctive normal form). Though the latter problem is NP-hard, we present an “efficient” method to do the conversion for the formulas that appear in this particular problem. When G is taken to be the dihedral group D_n for n ≤ 101, this method matches all of the previously known cyclic Ramsey graphs, as reported by F. R. K. Chung and C. M. Grinstead [“A Survey of Bounds for Classical Ramsey Numbers,” Journal of Graph Theory, 7 (1983), 25–38], in dramatically smaller computer time when compared to the time required by an exhaustive search. Five new lower bounds for the classical Ramsey numbers are established: R(4, 7) ? 47, R(4, 8) ? 52, R(4, 9) ? 69, R(5,7) ? 76, and R(5, 8) ? 94. Also, some previously known cyclic graphs are shown to be unique up to isomorphism.     

On the chromatic number of the general Kneser-graph

Given integers k, n, 2 < k < n, let us define a graph with vertex set V = {F ?{1, 2, …, n}: ∩F = k}, and (F, F') is an edge if |F ∩ F′| ≤ 1. We show that for n > n₀(k) the chromatic number of this graph is (k - 1)() + rs, where n = (k - 1)s + r, 0 ≤ r < k - 1.