SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W3042194019> ?p ?o ?g. }

Showing items 1 to 100 of ±136 with 100 items per page.

W3042194019 abstract "The neighborhood independence number of a graph G, denoted by β = β(G), is the size of the largest independent set in the neighborhood of any vertex. Graphs with bounded neighborhood independence, already for constant β, constitute a wide family of possibly dense graphs, including line graphs, unit-disk graphs, claw-free graphs and graphs of bounded growth, which has been well-studied in the area of distributed computing. In ICALP'19, Assadi and Solomon [8] showed that, for any n-vertex graph G, a maximal matching can be computed in O(n log n · β) time in the classic sequential setting. This result shows that, surprisingly, for almost the entire regime of parameter β, a maximal matching can be computed much faster than reading the entire input. The algorithm of [8], however, is inherently sequential and centralized. Moreover, a maximal matching provides a 2-approximate (maximum) matching, and the question of whether a better-than-2-approximate matching can be computed in sublinear time remained open." @default.
W3042194019 created "2020-07-16" @default.
W3042194019 creator A5054075729 @default.
W3042194019 creator A5084685735 @default.
W3042194019 date "2020-07-06" @default.
W3042194019 modified "2023-09-23" @default.
W3042194019 title "A Unified Sparsification Approach for Matching Problems in Graphs of Bounded Neighborhood Independence" @default.
W3042194019 cites W1523755288 @default.
W3042194019 cites W1964932074 @default.
W3042194019 cites W1967311985 @default.
W3042194019 cites W1975146994 @default.
W3042194019 cites W1980501142 @default.
W3042194019 cites W1980675521 @default.
W3042194019 cites W1982792741 @default.
W3042194019 cites W1983248819 @default.
W3042194019 cites W1997707549 @default.
W3042194019 cites W2011894656 @default.
W3042194019 cites W2012711355 @default.
W3042194019 cites W2048590231 @default.
W3042194019 cites W2051294918 @default.
W3042194019 cites W2052811387 @default.
W3042194019 cites W2064379477 @default.
W3042194019 cites W2073705438 @default.
W3042194019 cites W2092366448 @default.
W3042194019 cites W2133476289 @default.
W3042194019 cites W2136022810 @default.
W3042194019 cites W2146343385 @default.
W3042194019 cites W2157529519 @default.
W3042194019 cites W2161176300 @default.
W3042194019 cites W2165441947 @default.
W3042194019 cites W2275325805 @default.
W3042194019 cites W2328725012 @default.
W3042194019 cites W2341465683 @default.
W3042194019 cites W2542676400 @default.
W3042194019 cites W2546514055 @default.
W3042194019 cites W2568406555 @default.
W3042194019 cites W2619776170 @default.
W3042194019 cites W2734687249 @default.
W3042194019 cites W2767578875 @default.
W3042194019 cites W2788015272 @default.
W3042194019 cites W2809141942 @default.
W3042194019 cites W2810304763 @default.
W3042194019 cites W2885321421 @default.
W3042194019 cites W2952325666 @default.
W3042194019 cites W2952341094 @default.
W3042194019 cites W2953253371 @default.
W3042194019 cites W2962906928 @default.
W3042194019 cites W2963420932 @default.
W3042194019 cites W2963645943 @default.
W3042194019 cites W2963998331 @default.
W3042194019 cites W2964007887 @default.
W3042194019 cites W2968233966 @default.
W3042194019 cites W2968883141 @default.
W3042194019 cites W2972115413 @default.
W3042194019 cites W2972193181 @default.
W3042194019 cites W2999929254 @default.
W3042194019 cites W3035470141 @default.
W3042194019 cites W4205300528 @default.
W3042194019 cites W4233756358 @default.
W3042194019 cites W4235789583 @default.
W3042194019 cites W4249294792 @default.
W3042194019 cites W4250173201 @default.
W3042194019 cites W4252630569 @default.
W3042194019 cites W4253069973 @default.
W3042194019 doi "https://doi.org/10.1145/3350755.3400248" @default.
W3042194019 hasPublicationYear "2020" @default.
W3042194019 type Work @default.
W3042194019 sameAs 3042194019 @default.
W3042194019 citedByCount "3" @default.
W3042194019 countsByYear W30421940192021 @default.
W3042194019 countsByYear W30421940192022 @default.
W3042194019 crossrefType "proceedings-article" @default.
W3042194019 hasAuthorship W3042194019A5054075729 @default.
W3042194019 hasAuthorship W3042194019A5084685735 @default.
W3042194019 hasConcept C102192266 @default.
W3042194019 hasConcept C105795698 @default.
W3042194019 hasConcept C114614502 @default.
W3042194019 hasConcept C117160843 @default.
W3042194019 hasConcept C118615104 @default.
W3042194019 hasConcept C122818955 @default.
W3042194019 hasConcept C132525143 @default.
W3042194019 hasConcept C134306372 @default.
W3042194019 hasConcept C146661039 @default.
W3042194019 hasConcept C160446614 @default.
W3042194019 hasConcept C165064840 @default.
W3042194019 hasConcept C18359143 @default.
W3042194019 hasConcept C199360897 @default.
W3042194019 hasConcept C203776342 @default.
W3042194019 hasConcept C2777027219 @default.
W3042194019 hasConcept C33923547 @default.
W3042194019 hasConcept C34388435 @default.
W3042194019 hasConcept C35651441 @default.
W3042194019 hasConcept C41008148 @default.
W3042194019 hasConcept C43517604 @default.
W3042194019 hasConcept C74133993 @default.
W3042194019 hasConcept C80899671 @default.
W3042194019 hasConceptScore W3042194019C102192266 @default.
W3042194019 hasConceptScore W3042194019C105795698 @default.
W3042194019 hasConceptScore W3042194019C114614502 @default.
W3042194019 hasConceptScore W3042194019C117160843 @default.