SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W2775875721> ?p ?o ?g. }

Showing items 1 to 80 of 80 with 100 items per page.

W2775875721 endingPage "1915" @default.
W2775875721 startingPage "1901" @default.
W2775875721 abstract "Let G = (V, E) be an n-vertices m-edges directed graph with edge weights in the range [1, W] and L = log(W). Let s ∈ V be a designated source. In this paper we address several variants of the problem of maintaining the (1 + ∈)-approximate shortest path from s to each v ∈ V {s} in the presence of a failure of an edge or a vertex. From the graph theory perspective we show that G has a subgraph H with O(nL/∈) edges such that for any x, v ∈ V, the graph H x contains a path whose length is a (1 + ∈)-approximation of the length of the shortest path from s to v in G x. We show that the size of the subgraph H is optimal (up to logarithmic factors) by proving a lower bound of Ω(nL/∈) edges. Demetrescu, Thorup, Chowdhury and Ramachandran [12] showed that the size of a fault tolerant exact shortest path subgraph in weighted directed/undirected graphs is Ω(m). Parter and Peleg [18] showed that even in the restricted case of unweighted undirected graphs the size of any subgraph for the exact shortest path is at least Ω(n1.5). Therefore, a (1 + ∈)-approximation is the best one can hope for. We consider also the data structure problem and show that there exists an O(nL/∈) size oracle that for any v ∈ V reports a (1 + ∈)-approximate distance of v from s on a failure of any x ∈ V in O(log log1+∈(n W)) time. We show that the size of the oracle is optimal (up to logarithmic factors) by proving a lower bound of Ω(nL/∈ log n). Finally, we present two distributed algorithms. We present a single source routing scheme that can route on a (1 + ∈)-approximation of the shortest path from a fixed source s to any destination t in the presence of a fault. Each vertex has a label and a routing table of O(L/∈) bits. We present also a labeling scheme that assigns each vertex a label of O(L/∈) bits. For any two vertices x, v ∈ V the labeling scheme outputs a (1 + ∈)-approximation of the distance from s to v in G x using only the labels of x and v." @default.
W2775875721 created "2018-01-05" @default.
W2775875721 creator A5014419197 @default.
W2775875721 creator A5024739923 @default.
W2775875721 creator A5059835930 @default.
W2775875721 creator A5076616592 @default.
W2775875721 date "2018-01-01" @default.
W2775875721 modified "2023-09-23" @default.
W2775875721 title "Approximate Single Source Fault Tolerant Shortest Path" @default.
W2775875721 doi "https://doi.org/10.1137/1.9781611975031.124" @default.
W2775875721 hasPublicationYear "2018" @default.
W2775875721 type Work @default.
W2775875721 sameAs 2775875721 @default.
W2775875721 citedByCount "5" @default.
W2775875721 countsByYear W27758757212019 @default.
W2775875721 countsByYear W27758757212020 @default.
W2775875721 countsByYear W27758757212021 @default.
W2775875721 crossrefType "book-chapter" @default.
W2775875721 hasAuthorship W2775875721A5014419197 @default.
W2775875721 hasAuthorship W2775875721A5024739923 @default.
W2775875721 hasAuthorship W2775875721A5059835930 @default.
W2775875721 hasAuthorship W2775875721A5076616592 @default.
W2775875721 hasBestOaLocation W27758757211 @default.
W2775875721 hasConcept C114614502 @default.
W2775875721 hasConcept C118615104 @default.
W2775875721 hasConcept C132525143 @default.
W2775875721 hasConcept C134306372 @default.
W2775875721 hasConcept C199360897 @default.
W2775875721 hasConcept C22590252 @default.
W2775875721 hasConcept C2777735758 @default.
W2775875721 hasConcept C2778012994 @default.
W2775875721 hasConcept C33923547 @default.
W2775875721 hasConcept C39927690 @default.
W2775875721 hasConcept C41008148 @default.
W2775875721 hasConcept C54385418 @default.
W2775875721 hasConcept C77553402 @default.
W2775875721 hasConcept C80899671 @default.
W2775875721 hasConceptScore W2775875721C114614502 @default.
W2775875721 hasConceptScore W2775875721C118615104 @default.
W2775875721 hasConceptScore W2775875721C132525143 @default.
W2775875721 hasConceptScore W2775875721C134306372 @default.
W2775875721 hasConceptScore W2775875721C199360897 @default.
W2775875721 hasConceptScore W2775875721C22590252 @default.
W2775875721 hasConceptScore W2775875721C2777735758 @default.
W2775875721 hasConceptScore W2775875721C2778012994 @default.
W2775875721 hasConceptScore W2775875721C33923547 @default.
W2775875721 hasConceptScore W2775875721C39927690 @default.
W2775875721 hasConceptScore W2775875721C41008148 @default.
W2775875721 hasConceptScore W2775875721C54385418 @default.
W2775875721 hasConceptScore W2775875721C77553402 @default.
W2775875721 hasConceptScore W2775875721C80899671 @default.
W2775875721 hasLocation W27758757211 @default.
W2775875721 hasOpenAccess W2775875721 @default.
W2775875721 hasPrimaryLocation W27758757211 @default.
W2775875721 hasRelatedWork W1530560842 @default.
W2775875721 hasRelatedWork W1541319718 @default.
W2775875721 hasRelatedWork W1566918731 @default.
W2775875721 hasRelatedWork W1611628598 @default.
W2775875721 hasRelatedWork W1969625919 @default.
W2775875721 hasRelatedWork W1986192370 @default.
W2775875721 hasRelatedWork W1998002108 @default.
W2775875721 hasRelatedWork W2037065294 @default.
W2775875721 hasRelatedWork W2038855044 @default.
W2775875721 hasRelatedWork W2079318435 @default.
W2775875721 hasRelatedWork W2157760787 @default.
W2775875721 hasRelatedWork W2176550001 @default.
W2775875721 hasRelatedWork W2907241826 @default.
W2775875721 hasRelatedWork W2947576017 @default.
W2775875721 hasRelatedWork W2950691094 @default.
W2775875721 hasRelatedWork W2950975603 @default.
W2775875721 hasRelatedWork W3039916789 @default.
W2775875721 hasRelatedWork W3184504118 @default.
W2775875721 hasRelatedWork W3188066388 @default.
W2775875721 hasRelatedWork W3196638783 @default.
W2775875721 isParatext "false" @default.
W2775875721 isRetracted "false" @default.
W2775875721 magId "2775875721" @default.
W2775875721 workType "book-chapter" @default.