Approximate Distance Oracles Subject to Multiple Vertex Failures
Given an undirected graph$G=(V,E)$of$n$vertices and$m$edges with weights in$[1,W]$ , we construct vertex sensitive distance oracles (VSDO), which are data structures that preprocess the graph, and answer the following kind of queries: Given a source vertex$u$ , a target vertex$v$ , and a batch of$d$...
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Main Authors | , , |
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Format | Journal Article |
Language | English |
Published |
17.02.2020
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Subjects | |
Online Access | Get full text |
DOI | 10.48550/arxiv.2002.06812 |
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Summary: | Given an undirected graph$G=(V,E)$of$n$vertices and$m$edges with weights in$[1,W]$ , we construct vertex sensitive distance oracles (VSDO), which are data structures that preprocess the graph, and answer the following kind of queries: Given a source vertex$u$ , a target vertex$v$ , and a batch of$d$failed vertices$D$ , output (an approximation of) the distance between$u$and$v$in$G-D$(that is, the graph$G$with vertices in$D$removed). An oracle has stretch$\alpha$if it always holds that$\delta_{G-D}(u,v)\le\tilde{\delta}(u,v)\le\alpha\cdot\delta_{G-D}(u,v)$ , where$\delta_{G-D}(u,v)$is the actual distance between$u$and$v$in$G-D$ , and$\tilde{\delta}(u,v)$is the distance reported by the oracle. In this paper we construct efficient VSDOs for any number$d$of failures. For any constant$c\geq 1$ , we propose two oracles:$\bullet$The first oracle has size$n^{2+1/c}(\log n/\epsilon)^{O(d)}\cdot \log W$ , answers a query in${\rm poly}(\log n,d^c,\log\log W,\epsilon^{-1})$time, and has stretch$1+\epsilon$ , for any constant$\epsilon>0$ .$\bullet$The second oracle has size$n^{2+1/c}{\rm poly}(\log (nW),d)$ , answers a query in${\rm poly}(\log n,d^c,\log\log W)$time, and has stretch${\rm poly}(\log n,d)$ . Both of these oracles can be preprocessed in time polynomial in their space complexity. These results are the first approximate distance oracles of poly-logarithmic query time for any constant number of vertex failures in general undirected graphs. Previously there are$(1+\epsilon)$ -approximate$d$ -edge sensitive distance oracles [Chechik et al. 2017] answering distance queries when$d$edges fail, which have size$O(n^2(\log n/\epsilon)^d\cdot d\log W)$and query time${\rm poly}(\log n, d, \log\log W)$ . |
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DOI: | 10.48550/arxiv.2002.06812 |