Routing in polygonal domains

Banyassady, Bahareh; Chiu, Man Kwun; Korman, Matias; Mulzer, Wolfgang; Renssen, André van; Roeloffzen, Marcel; Seiferth, Paul; Stein, Yannik; Vogtenhuber, Birgit; Willert, Max

doi:10.1016/j.comgeo.2019.101593

Cited by 5 publications

(5 citation statements)

References 49 publications

(57 reference statements)

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“…There has been extensive research into routing algorithms, including routing on the visibility graph in the presence of line segment obstacles [5,9,10]. For polygonal obstacles, Banyassady et al [1] developed a routing algorithm on the visibility graph with polygonal obstacles, though this work requires some additional information to be stored at the vertices.…”

Section: Discussionmentioning

confidence: 99%

Bounded-Degree Spanners in the Presence of Polygonal Obstacles

Renssen¹,

Wong²

2020

Preprint

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Section: Discussionmentioning

confidence: 99%

Bounded-Degree Spanners in the Presence of Polygonal Obstacles

Renssen¹,

Wong²

2020

Preprint

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“…Again, the number of bits for the labels is poly-logarithmic [21]. The same holds for visibility graphs of simple polygons [4]. Moreover, see [2] for different routing compact routing schemes in networks with low doubling dimension.…”

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confidence: 84%

“…More precisely, Chan and Skrepetos show that given V , one can compute in O(n log n + (1/ε)n) time a decomposition tree T for DG(V ) with the following properties. 4 • Every node µ of T is assigned two sets: port(µ) ⊆ V (µ) ⊆ V . The subgraph of DG(V ) induced by V (µ) is connected and the vertices in port(µ) are called portals.…”

Section: The Distance Oracle Of Chan and Skrepetosmentioning

confidence: 99%

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Routing in Unit Disk Graphs without Dynamic Headers

Mulzer¹,

Willert²

2020

Preprint

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Let V ⊂ R 2 be a set of n sites in the plane. The unit disk graph DG(V ) of V is the graph with vertex set V in which two sites v and w are adjacent if and only if their Euclidean distance is at most 1.We develop a compact routing scheme R for DG(V ). The routing scheme R preprocesses DG(V ) by assigning a label (v) to every site v in V . After that, for any two sites s and t, the scheme R must be able to route a packet from s to t as follows: given the label of a current vertex r (initially, r = s) and the label of the target vertex t, the scheme determines a neighbor r of r. Then, the packet is forwarded to r , and the process continues until the packet reaches its desired target t. The resulting path between the source s and the target t is called the routing path of s and t. The stretch of the routing scheme is the maximum ratio of the total Euclidean length of the routing path and of the shortest path in DG(V ), between any two sites s, t ∈ V .We show that for any given ε > 0, we can construct a routing scheme for DG(V ) with diameter D that achieves stretch 1 + ε and label size O(log D log 3 n/ log log n) (the constant in the O-Notation depends on ε). In the past, several routing schemes for unit disk graphs have been proposed. Our scheme is the first one to achieve poly-logarithmic label size and arbitrarily small stretch without storing any additional information in the packet.

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“…We consider routing in a particularly interesting class of geometric graphs, namely visibility graphs of polygons. Banyassady et al [3] presented a routing scheme for polygonal domains with n vertices and h holes that uses O(log n) bits for the label, O((ε −1 + h) log n) bits for the routing tables, and achieves a stretch of 1 + ε, for any fixed ε > 0. However, their approach is efficient only if the edges of the visibility graph are weighted with their Euclidean lengths.…”

Section: Introductionmentioning

confidence: 99%

Routing in Histograms

Chiu

Cleve

Klost

et al. 2020

WALCOM: Algorithms and Computation

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Let P be an x-monotone orthogonal polygon with n vertices. We call P a simple histogram if its upper boundary is a single edge; and a double histogram if it has a horizontal chord from the left boundary to the right boundary. Two points p and q in P are co-visible if and only if the (axis-parallel) rectangle spanned by p and q completely lies in P . In the r-visibility graph G(P ) of P , we connect two vertices of P with an edge if and only if they are co-visible.We consider routing with preprocessing in G(P ). We may preprocess P to obtain a label and a routing table for each vertex of P . Then, we must be able to route a packet between any two vertices s and t of P , where each step may use only the label of the target node t, the routing table and neighborhood of the current node, and the packet header.We present a routing scheme for double histograms that sends any data packet along a path whose length is at most twice the (unweighted) shortest path distance between the endpoints. In our scheme, the labels, routing tables, and headers need O(log n) bits. For the case of simple histograms, we obtain a routing scheme with optimal routing paths, O(log n)-bit labels, one-bit routing tables, and no headers.

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Routing in polygonal domains

Cited by 5 publications

References 49 publications

Bounded-Degree Spanners in the Presence of Polygonal Obstacles

Bounded-Degree Spanners in the Presence of Polygonal Obstacles

Routing in Unit Disk Graphs without Dynamic Headers

Routing in Histograms

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