Visualizing, Finding and Packing Dijoins

Shepherd, F. Bruce; Vetta, Adrian

doi:10.1007/0-387-25592-3_8

Cited by 6 publications

(4 citation statements)

References 31 publications

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“…It is shown in [41] that given a weighted digraph (D, w) where the minimum weight of a dicut is τ , there exists a 1 2 -integral w-weighted packing of dijoins of value τ 2 , giving some hope for a positive answer to Question 8.7 (2).…”

Section: Fractional Weighted Packing Of Dijoinsmentioning

confidence: 99%

On Packing Dijoins in Digraphs and Weighted Digraphs

Abdi,

Cornuéjols,

Zlatin

2023

SIAM J. Discrete Math.

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Let D = (V, A) be a digraph. A dicut is a cut δ + (U ) ⊆ A for some nonempty proper vertex subset U such that δ − (U ) = ∅, a dijoin is an arc subset that intersects every dicut at least once, and more generally a k-dijoin is an arc subset that intersects every dicut at least k times. Our first result is that A can be partitioned into a dijoin and a (τ − 1)-dijoin where τ denotes the smallest size of a dicut. Woodall conjectured the stronger statement that A can be partitioned into τ dijoins.Let w ∈ Z A ≥0 and suppose every dicut has weight at least τ , for some integer τ ≥ 2. Let ρ(τ, D, w) := 1 τ v∈V m v , where each m v is the integer in {0, 1, . . . , τ − 1} equal to w(δ + (v)) − w(δ − (v)) mod τ . We prove the following results:(i) If ρ(τ, D, w) ∈ {0, 1}, then there is an equitable w-weighted packing of dijoins of size τ .(ii) If ρ(τ, D, w) = 2, then there is a w-weighted packing of dijoins of size τ .(iii) If ρ(τ, D, w) = 3, τ = 3, and w = 1, then A can be partitioned into three dijoins.Each result is best possible: (i) does not hold for ρ(τ, D, w) = 2 even if w = 1, (ii) does not hold for ρ(τ, D, w) = 3, and (iii) do not hold for general w.

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Section: Fractional Weighted Packing Of Dijoinsmentioning

confidence: 99%

On Packing Dijoins in Digraphs and Weighted Digraphs

Abdi,

Cornuéjols,

Zlatin

2023

SIAM J. Discrete Math.

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“…Note that if every circuit contains a digon, then the graph contains no loops or cycles of length at least three. The following appears in [9]. Now assume that D contains a loop a at digon-tree node T .…”

Section: Digon-tree Representationsmentioning

confidence: 97%

Degree-constrained network flows

Donovan

Shepherd

Vetta

et al. 2007

Proceedings of the Thirty-Ninth Annual ACM Symposium on Theory of Computing

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A d-furcated flow is a network flow whose support graph has maximum outdegree d. Take a single-sink multicommodity flow problem on any network and with any set of routing demands. Then we show that the existence of feasible fractional flow with node congestion one implies the existence of a d-furcated flow with congestion at most 1 + 1 d−1 , for d ≥ 2. This result is tight, and so the congestion gap for d-furcated flows is bounded and exactly equal to 1 + 1 d−1 . For the case d = 1 (confluent flows), it is known that the congestion gap is unbounded, namely Θ(log n). Thus, allowing single-sink multicommodity network flows to increase their maximum outdegree from one to two virtually eliminates this previously observed congestion gap.As a corollary we obtain a factor 1 + 1 d−1 -approximation algorithm for the problem of finding a minimum congestion d-furcated flow; we also prove that this problem is maxSNPhard. Using known techniques these results also extend to degree-constrained unsplittable routing, where each individual demand must be routed along a unique path.

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“…Gabow improved Frank's algorithm to run in O(n 2 m) time using the centroid tree, which was also used in the minimum cost k-arc-connected orientation problem. In contrast, Shepherd and Vetta [13] devised an algorithm that runs in O(n 2 m) time without using any complex data structures. However, the algorithm of Shepherd and Vetta performs preprocessing, which requires to maintain n graphs using O(nm) space.…”

mentioning

confidence: 90%

An Algorithm for Minimum Cost Arc-Connectivity Orientations

Iwata

Kobayashi

2008

Algorithmica

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Given a 2k-edge-connected undirected graph, we consider to find a minimum cost orientation that yields a k-arc-connected directed graph. This minimum cost k-arc-connected orientation problem is a special case of the submodular flow problem. Frank (1982) devised a combinatorial algorithm that solves the problem in O(k 2 n 3 m) time, where n and m are the numbers of vertices and edges, respectively. Gabow (1995) improved Frank's algorithm to run in O(kn 2 m) time by introducing a new sophisticated data structure. We describe an algorithm that runs in O(k 3 n 3 + kn 2 m) time without using sophisticated data structures. In addition, we present an application of the algorithm to find a shortest dijoin in O(n 2 m) time, which matches the current best bound.

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Visualizing, Finding and Packing Dijoins

Cited by 6 publications

References 31 publications

On Packing Dijoins in Digraphs and Weighted Digraphs

On Packing Dijoins in Digraphs and Weighted Digraphs

Degree-constrained network flows

An Algorithm for Minimum Cost Arc-Connectivity Orientations

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