In the Survivable Network Design Problem (SNDP), the input is an edge-weighted (di)graph G and an integer ruυ for every pair of vertices u, υ ∊ V(G). The objective is to construct a subgraph H of minimum weight which contains ruυ edge-disjoint (or node-disjoint) u-υ paths. This is a fundamental problem in combinatorial optimization that captures numerous well-studied problems in graph theory and graph algorithms. Consequently, there is a long line of research into exact-polynomial time algorithms as well as approximation algorithms for various restrictions of this problem.\ud\udAn important restriction of this problem is one where the connectivity demands are the same for every pair of vertices. In this paper, we first consider the edge-connectivity version of this problem which we call λ-Edge Connected Subgraph (λ-ECS). In this problem, the input is a λ-edge connected (di)graph G and an integer k and the objective is to check whether G contains a spanning subgraph H that is also λ-edge connected and H excludes at least k edges of G. In other words, we are asked to compute a maximum subset of edges, of cardinality at least k, which may be safely deleted from G without affecting its connectivity. If we replace λ-edge connectivity with λ-vertex connectivity we get the λ-Vertex Connected Subgraph (λ-VCS) problem.\ud\udWe show that λ-ECS is fixed-parameter tractable (FPT) for both graphs and digraphs even if the (di)graph has nonnegative real weights on the edges and the objective is to exclude from H, some edges of G whose total weight exceeds a prescribed value. In particular, we design an algorithm for the weighted variant of the problem with running time 2O(k log k) |V(G)|O(1). We follow up on this result and obtain a polynomial compression for λ-ECS on unweighted graphs. As a direct consequence of our results, we obtain the first FPT algorithm for the parameterized version of the classical Minimum Equivalent Graph (MEG) problem. We also show that λ-Ves is FPT on digraphs; however the problem on undirected graphs remains open. Finally, we complement our algorithmic findings by showing that SNDP is W[1]-hard for both arc and vertex connectivity versions on digraphs. The core of our algorithms is composed of new combinatorial results on connectivity in digraphs and undirected graphs.\ud\ud\ud\ud\ud
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机译:在可生存网络设计问题(SNDP)中,输入是边权重(di)图G和每对顶点u,υV(G)的整数ruυ。目的是构造最小权重的子图H,该子图H包含规则的边不相交(或节点不相交)的u-υ路径。这是组合优化中的一个基本问题,它捕获了图论和图算法中许多经过充分研究的问题。因此,对于精确多项式时间算法以及逼近算法,针对该问题的各种限制,人们进行了大量研究。\ ud \ ud该问题的一个重要限制是,每对顶点的连通性需求都相同。在本文中,我们首先考虑该问题的边缘连通性版本,我们将其称为λ边缘连通子图(λ-ECS)。在这个问题中,输入是一个λ边连接的(二)图G和一个整数k,目的是检查G是否包含也是λ边连接的生成子图H,并且H至少排除G的k个边换句话说,要求我们计算基数至少为k的最大边缘子集,可以将其安全地从G中删除而不会影响其连通性。如果用λ-顶点连通性替换λ-edge连接性,则会出现λ-顶点连通子图(λ-VCS)问题。\ ud \ ud我们证明,即使对于图和有向图,λ-ECS都是固定参数可处理的(FPT)。如果(二)图的边缘具有非负的实际权重,并且目标是从H中排除G的某些边缘,这些边缘的总权重超过规定值。特别是,我们针对运行时间为2O(k log k)| V(G)| O(1)的问题的加权变量设计一种算法。我们对该结果进行跟踪,并在未加权图上获得λ-ECS的多项式压缩。作为我们结果的直接结果,我们获得了经典最小等效图(MEG)问题的参数化版本的第一个FPT算法。我们还证明了有向图上的λ-Ves是FPT。但是,无向图上的问题仍然存在。最后,我们通过显示有向图上的弧和顶点连接版本的SNDP都是W [1] -hard来补充我们的算法发现。我们算法的核心由关于有向图和无向图的连通性的新组合结果组成。\ ud \ ud \ ud \ ud \ ud \ ud
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