TY - GEN
T1 - f-sensitivity distance Oracles and routing schemes
AU - Chechik, S
AU - Langberg, M
AU - Peleg, D
AU - Roditty, L
N1 - Place of conference:UK
PY - 2010
Y1 - 2010
N2 - An f-sensitivity distance oracle for a weighted undirected graph G(V,E) is a data structure capable of answering restricted distance queries between vertex pairs, i.e., calculating distances on a subgraph avoiding some forbidden edges. This paper presents an efficiently constructible f-sensitivity distance oracle that given a triplet (s,t,F), where s and t are vertices and F is a set of forbidden edges such that |F| ≤ f, returns an estimate of the distance between s and t in G(V,E ∖ F). For an integer parameter k ≥ 1, the size of the data structure is O(fkn 1 + 1/k log(nW)), where W is the heaviest edge in G, the stretch (approximation ratio) of the returned distance is (8k − 2)(f + 1), and the query time is O(|F|·log2 n·loglogn·loglogd), where d is the distance between s and t in G(V,E ∖ F).
The paper also considers f-sensitive compact routing schemes, namely, routing schemes that avoid a given set of forbidden (or failed) edges. It presents a scheme capable of withstanding up to two edge failures. Given a message M destined to t at a source vertex s, in the presence of a forbidden edge set F of size |F| ≤ 2 (unknown to s), our scheme routes M from s to t in a distributed manner, over a path of length at most O(k) times the length of the optimal path (avoiding F). The total amount of information stored in vertices of G is O(k n 1 + 1/k log(nW)logn).
AB - An f-sensitivity distance oracle for a weighted undirected graph G(V,E) is a data structure capable of answering restricted distance queries between vertex pairs, i.e., calculating distances on a subgraph avoiding some forbidden edges. This paper presents an efficiently constructible f-sensitivity distance oracle that given a triplet (s,t,F), where s and t are vertices and F is a set of forbidden edges such that |F| ≤ f, returns an estimate of the distance between s and t in G(V,E ∖ F). For an integer parameter k ≥ 1, the size of the data structure is O(fkn 1 + 1/k log(nW)), where W is the heaviest edge in G, the stretch (approximation ratio) of the returned distance is (8k − 2)(f + 1), and the query time is O(|F|·log2 n·loglogn·loglogd), where d is the distance between s and t in G(V,E ∖ F).
The paper also considers f-sensitive compact routing schemes, namely, routing schemes that avoid a given set of forbidden (or failed) edges. It presents a scheme capable of withstanding up to two edge failures. Given a message M destined to t at a source vertex s, in the presence of a forbidden edge set F of size |F| ≤ 2 (unknown to s), our scheme routes M from s to t in a distributed manner, over a path of length at most O(k) times the length of the optimal path (avoiding F). The total amount of information stored in vertices of G is O(k n 1 + 1/k log(nW)logn).
UR - https://scholar.google.co.il/scholar?q=f-Sensitivity+Distance+Oracles+and+Routing+Schemes&btnG=&hl=en&as_sdt=0%2C5
M3 - Conference contribution
BT - European Symposium on Algorithms
A2 - Berg, Mark de
A2 - Meyer, Ulrich
PB - Springer Berlin Heidelberg
ER -