SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W2796253518> ?p ?o ?g. }

Showing items 1 to 68 of 68 with 100 items per page.

W2796253518 abstract "The areas of Ramsey theory and random graphs have been closely linked ever since Erdős' famous proof in 1947 that the 'diagonal' Ramsey numbers $R(k)$ grow exponentially in $k$. In the early 1990s, the triangle-free process was introduced as a model which might potentially provide good lower bounds for the 'off-diagonal' Ramsey numbers $R(3,k)$. In this model, edges of $K_n$ are introduced one-by-one at random and added to the graph if they do not create a triangle; the resulting final (random) graph is denoted $G_{n,triangle}$. In 2009, Bohman succeeded in following this process for a positive fraction of its duration, and thus obtained a second proof of Kim's celebrated result that $R(3,k) = Theta big( k^2 / log k big)$. In this paper we improve the results of both Bohman and Kim, and follow the triangle-free process all the way to its asymptotic end. In particular, we shall prove that $$ebig( G_{n,triangle} big) ,=, left( frac{1}{2sqrt{2}} + o(1) right) n^{3/2} sqrt{log n },$$ with high probability as $n to infty$. We also obtain several pseudorandom properties of $G_{n,triangle}$, and use them to bound its independence number, which gives as an immediate corollary $$R(3,k) , ge , left( frac{1}{4} - o(1) right) frac{k^2}{log k}.$$ This significantly improves Kim's lower bound, and is within a factor of $4 + o(1)$ of the best known upper bound, proved by Shearer over 25 years ago." @default.
W2796253518 created "2018-04-13" @default.
W2796253518 creator A5020452147 @default.
W2796253518 creator A5029881267 @default.
W2796253518 creator A5077696461 @default.
W2796253518 date "2013-02-25" @default.
W2796253518 modified "2023-09-27" @default.
W2796253518 title "The triangle-free process and the Ramsey number $R(3,k)$" @default.
W2796253518 hasPublicationYear "2013" @default.
W2796253518 type Work @default.
W2796253518 sameAs 2796253518 @default.
W2796253518 citedByCount "9" @default.
W2796253518 countsByYear W27962535182015 @default.
W2796253518 countsByYear W27962535182017 @default.
W2796253518 countsByYear W27962535182018 @default.
W2796253518 countsByYear W27962535182021 @default.
W2796253518 countsByYear W27962535182023 @default.
W2796253518 crossrefType "posted-content" @default.
W2796253518 hasAuthorship W2796253518A5020452147 @default.
W2796253518 hasAuthorship W2796253518A5029881267 @default.
W2796253518 hasAuthorship W2796253518A5077696461 @default.
W2796253518 hasConcept C114614502 @default.
W2796253518 hasConcept C118615104 @default.
W2796253518 hasConcept C130367717 @default.
W2796253518 hasConcept C132525143 @default.
W2796253518 hasConcept C134306372 @default.
W2796253518 hasConcept C2524010 @default.
W2796253518 hasConcept C33923547 @default.
W2796253518 hasConcept C44115641 @default.
W2796253518 hasConcept C47458327 @default.
W2796253518 hasConcept C77553402 @default.
W2796253518 hasConceptScore W2796253518C114614502 @default.
W2796253518 hasConceptScore W2796253518C118615104 @default.
W2796253518 hasConceptScore W2796253518C130367717 @default.
W2796253518 hasConceptScore W2796253518C132525143 @default.
W2796253518 hasConceptScore W2796253518C134306372 @default.
W2796253518 hasConceptScore W2796253518C2524010 @default.
W2796253518 hasConceptScore W2796253518C33923547 @default.
W2796253518 hasConceptScore W2796253518C44115641 @default.
W2796253518 hasConceptScore W2796253518C47458327 @default.
W2796253518 hasConceptScore W2796253518C77553402 @default.
W2796253518 hasLocation W27962535181 @default.
W2796253518 hasOpenAccess W2796253518 @default.
W2796253518 hasPrimaryLocation W27962535181 @default.
W2796253518 hasRelatedWork W1582237054 @default.
W2796253518 hasRelatedWork W1890577096 @default.
W2796253518 hasRelatedWork W1973915392 @default.
W2796253518 hasRelatedWork W1976442532 @default.
W2796253518 hasRelatedWork W2007851259 @default.
W2796253518 hasRelatedWork W2025859007 @default.
W2796253518 hasRelatedWork W2074920973 @default.
W2796253518 hasRelatedWork W2106456894 @default.
W2796253518 hasRelatedWork W2340026689 @default.
W2796253518 hasRelatedWork W2404118392 @default.
W2796253518 hasRelatedWork W2744053296 @default.
W2796253518 hasRelatedWork W2768930897 @default.
W2796253518 hasRelatedWork W2924365128 @default.
W2796253518 hasRelatedWork W2950098404 @default.
W2796253518 hasRelatedWork W2951566843 @default.
W2796253518 hasRelatedWork W2952750031 @default.
W2796253518 hasRelatedWork W2969799327 @default.
W2796253518 hasRelatedWork W2980245002 @default.
W2796253518 hasRelatedWork W3104768492 @default.
W2796253518 hasRelatedWork W3186330835 @default.
W2796253518 isParatext "false" @default.
W2796253518 isRetracted "false" @default.
W2796253518 magId "2796253518" @default.
W2796253518 workType "article" @default.