Questions tagged [graph-theory]
Graph theory is the study of graphs, mathematical structures used to model pairwise relations between objects.
1,283
questions
5
votes
1answer
87 views
Known property? Maximum radius of connected induced subgraph
I was wondering if the following graph property has a name and has been researched:
Consider any connected induced subgraph $H \subseteq G$.
Then $r(G)$ denotes the maximum radius of any such $H$.
I ...
-2
votes
1answer
84 views
Minimum vertex cover and odd cycles
Suppose we have a graph G without odd cycles. Consider the minimum vertex cover problem of G formulated as a linear programming problem, that is for each vertex $v_{i}$ we have the variable $x_{i}$, ...
1
vote
0answers
72 views
Fast Computation of First k Eigenvectors of Graph Laplacian
I'm looking for references for the following; Given the unnormalized Laplacian matrix of a graph $L = D - A, ~ L \in \mathbb{R}^{n\times n}$
Algorithm(s) to efficiently estimate the first $k$ (...
3
votes
0answers
81 views
Isomorphic subforest problem
I recently read that the following problem is NP-Complete:
Given a tree $T$, and a forest $F$, is there a subgraph of $T$ isomorphic to $F$?
The reference provide was to the textbook “Computers and ...
12
votes
1answer
862 views
Consequences of $\oplus \mathbf{P} \subseteq \mathbf{NP}$
I have part of a proof attempt of $\oplus \mathbf{P} \subseteq \mathbf{NP}$. The proof attempt consists of a Karp reduction from the $\oplus \mathbf{P}$-complete problem $\oplus$3-REGULAR VERTEX COVER ...
1
vote
0answers
74 views
How to approach the “traveling salesman problem” with cost changing every time salesman reaches a new city
Let's say instead of finding the shortest path we have to maximize the profit in a year of the salesman under the following constraints.
Salesman can go to a different city only on weekends, all ...
4
votes
1answer
113 views
Hardness of finding if a vertex lies on a simple directed path between two vertices
Given a directed graph $G = (V, E)$ and three vertices $u, v, w \in V$. Is it NP-Hard to find whether there is a simple path from $u$ to $v$ passing through $w$?
I found a couple of hardness ...
0
votes
1answer
54 views
Reduction graph to planar bounded treewidth and bounded diameter graph
We got reduction graph to planar bounded treewidth graph,
but this is unlikely to be true.
Let $H$, the planarizing gadget, be planar graph with four
distinguished vertices $u,u',v,v'$ on the outer ...
5
votes
1answer
176 views
Is this a known problem, and is it #P-complete?
Let $G=(V,E)$ be an undirected graph. What I call a selection function of $G$ is a partial function $f:V \to E$ such that for every node $v$, if $f(v)$ is defined then it is one of the adjacent edges ...
2
votes
1answer
47 views
Maximum subgraph problem with unknown complexity
Let $Q$ be a polynomial time decidable graph property. In a graph let us call a subgraph $S$ a $Q$-subgraph, if $S$ has the property $Q$. Consider the following optimization problem:
Maximum $Q$-...
1
vote
1answer
46 views
Existence of graphs of every order related to Barnette’s conjecture
Consider the class C3CBP of $3$-connected cubic bipartite planar graphs. They form the class on which the (in)famous Barnette’s conjecture is based. My interest in C3CBP graphs is somewhat orthogonal ...
6
votes
2answers
143 views
$NP$-Completeness of $\epsilon$-balanced graph partitioning for fixed $\epsilon$
Consider this graph partitioning problem: Let $G = (V, E)$ be a simple undirected graph and $0 \leq \epsilon \leq 1, M \geq 0$ be constants. Are there disjoint subsets $V_1, V_2$ with $V = V_1 \cup ...
9
votes
2answers
111 views
Complexity of finding an edge set yielding specified vertex degrees
I'm trying to figure out if the following two problems are known in general to be in P or NP-complete:
Q1: Given a graph $G=(V,E)$ and integers $d_i,\,1\leq\,i\leq|V|$, does there exist a subset $E'...
12
votes
0answers
119 views
NP-Hardness of 4-cycle packing problem in complete bipartite digraph?
A directed complete bipartite graph is a bipartite graph where there is exactly one directed edge between any two vertices from its two different parts. In other words, it's an orientation of a ...
7
votes
0answers
126 views
Algebraic methods for testing planarity
Mac Lane's planarity criterion states that a graph is planar if and only if it has a cycle basis such that each edge is contained in at most two cycles, we call such a basis a 2-basis. A 2-basis of a ...
6
votes
1answer
188 views
Complexity of finding the largest induced subgraph with all even degrees
What is the complexity of the following problem?
Instance: Simple, undirected graph $G$, and a positive integer $k$.
Question: Does $G$ have an induced subgraph on at least $k$ vertices, such that ...
13
votes
1answer
4k views
What is the correct definition of $k$-tree?
As the title says, what is the correct definition of $k$-tree? There are several papers that talk about $k$-trees and partial $k$-trees as alternative definitions for graphs with bounded treewidth, ...
5
votes
0answers
133 views
How much does treewidth changes after removal of a path?
Let $G$ be a graph such that $\mathrm{tw}(G)=t$. Let $t' = \min\limits_{u,v \in V(G)} \max\limits_{P \text{ is a path from } u \text{ to } v} \mathrm{tw}(G - P)$. Then how small $t'$ can be?
My ...
6
votes
2answers
157 views
Computing the edge orbits of a graph (and discussing definitions)
A (vertex) automorphism in a graph $G=(V,E)$ is a permutation $\sigma$ of the vertices that preserves adjacency, namely $\sigma(u) \sigma(v) \in E$ if and only if $uv \in E$. The automorphisms of a ...
7
votes
0answers
175 views
Lighting up all elements of a poset by toggling upsets
I consider the following game on a finite poset $(P, <)$. At each point of the game, I have a set of elements $S$ of the poset which are "on", and all others are "off". Initially $S = \emptyset$. ...
8
votes
2answers
472 views
Dijkstra parallelization
I'd like to know what is the best method to parallelize the Dijkstra algorithm.
Thanks.
-4
votes
1answer
100 views
22
votes
8answers
3k views
NP-hard problems on paths
everybody knows there exist many decision problems which are NP-hard on general graphs, but I'm interested in problems that are even NP-hard when the underlying graph is a path. So, can you help me to ...
1
vote
1answer
119 views
Breaking cycles in network graph by adding nodes and rerouting edges
I have a quite "common" need : making a directed graph (with one or several cycles) a directed acyclic graph (DAG).
But the way I want to achieve it is, I guess, way more specific : I would like to ...
2
votes
0answers
90 views
How hard is it to determine ex(n,G)?
Define the extremal Turán function $ex(n,G)$ of a graph $G$ as the most edges a graph on $n$ vertices can have without having a subgraph that is isomorphic to $G$. This function is known ...
22
votes
5answers
9k views
Vertex Cover applications in the real world
What applications does the Vertex Cover Problem have in the real world?
Which industry or research projects use actually implemented software that is based on theoretical results for the Vertex Cover ...
0
votes
1answer
155 views
Find the shortest s-t trail(edge disjoint path) in a graph with negative weight edges
A walk in a graph is a finite or infinite sequence of edges which joins a sequence of vertices. A trail is a walk in which all edges are distinct. Note that a trial may visit a vertex multiple times ...
1
vote
1answer
99 views
Finding simple fixed length paths in directed graphs
Is there an efficient algorithm to enumerate unique simple fixed-length paths (of size $k$) in directed graphs? What would be its time complexity?
9
votes
1answer
121 views
The source of the modular decomposition graph
When introducing graph modular decomposition, most authors use the 11-vertex graph, which I copy from wikipedia.
The question is who is (are) the original designer of it. (I'm not asking who drew ...
25
votes
1answer
676 views
Regularity Lemma for Sparse Graphs
Szemeredi's Regularity Lemma says that every dense graph can be approximated as a union of $O(1)$ many bipartite expander graphs. More accurately, there's a partition of most vertices into $O(1)$ sets ...
0
votes
0answers
101 views
Network Reliability Problem
Network reliability, in which we are given an undirected graph $G$ with a failure probability $p_e$ for each edge and we are asked to calculate the probability that the network becomes disconnected ...
0
votes
1answer
73 views
Dividing a complete graph into two cliques with maximal sum of edge weights
Problem: Considering a complete weighted graph $G$ with $n$ vertices, where $n\in2\mathbb Z$ is an even number, remove edges in such a way that you end up with two cliques of graph $G$, each having $\...
9
votes
2answers
274 views
How long does it take to find a short cycle in a random graph?
Let $G \sim G(n, n^{-1/2})$ be a random graph on $\approx n^{3/2}$ edges. With very high probability, $G$ has many $4$-cycles. Our goal is to output any one of these $4$-cycles as quickly as ...
10
votes
2answers
183 views
“Relatives” of the shortest path problem
Consider a connected undirected graph with non-negative edge weights, and two distinguished vertices $s,t$. Below are some path problems that are all of the following form: find an $s-t$ path, such ...
3
votes
0answers
129 views
Enumerating Minimal (a,b) vertex separators in a DAG
A vertex subset $S \subseteq V$ is an $(a,b)$ separator for nonadjacent vertices $a$ and $b$ if the removal of $S$ from a graph $G$ separates $a$ and $b$ into distinct connected components.
$S$ is a ...
2
votes
1answer
110 views
Relationship between $O(\log n)$ (bounded) treewidth and H-minor-free
What is the relationship between graphs which have $O(\log n)$ treewidth and $\mathcal{H}$-minor-free graphs? Are graphs which have $O(\log n)$ treewidth $\mathcal{H}$-minor-free? I know that graphs ...
0
votes
0answers
61 views
Generalization of k-Coloring: maximizing the number of vertices with no neighbours of same color
One can consider the following generalization of the $k$-Coloring problem:
Let be given a graph $G$ and an two integers $k$ and $p$. A vertex $v$ of $G$ is properly colored if $v$ has no neighbour ...
2
votes
3answers
3k views
Animate a graphviz graph
I'm exploring some graph algorithms, and would like to animate the graph change over time (e.g. when adding a heap node or balancing a tree).
Is there a nice way to animate a sequence of ...
7
votes
2answers
194 views
Lower bound on pebbling numbers
Out of curiosity, I tried finding the original paper showing that there are graphs that require $n/\log n$ pebbles in the sense of Hopcroft, Paul, and Valiant’s seminal paper “On Time Versus Space”. (...
2
votes
1answer
166 views
How many samples are needed to reconstruct a path?
Consider an input set of vertices $V$ and vertices $s,t\in V$.
The goal is to learn some unknown shortest path from $s$ to $t$; the set of edges of the graph is hidden at first and there may be ...
0
votes
0answers
79 views
Expected value of a random experiment in a graph
I need to find the expected value of R in the random experiment below.
$$
R = \frac{1}{K} \sum_{C \in \mathcal{H} } \ [\frac{1}{2} |V(C)| * (|V(C)| - 1) - |C|]
$$
$\mathcal{H}$ is a partition on ...
9
votes
1answer
432 views
Complexity of k-clique for hypergraphs
Classic Problem:
Let a number $k$ be given. The $k$-clique problem is as follows.
Given a graph $G$, does there exist a subset $S$ of $k$ vertices so that any two vertices of $S$ are adjacent?
...
1
vote
1answer
1k views
directed or bidirected in relation to mssp (Multiple source shortest path)
Firstly I wanted to ask. If I have a undirected graph and split all the edges into two directed edges is it still called directed or does it become bi-directed?
The main question is i have a graph ...
2
votes
0answers
53 views
Is minimal cover under symmetric 3-deduction NP-complete?
Forgive me if this problem is known by another name, I do not know any references for it.
Symmetric deduction. An equation $e \in E$ is a subset of variables $V$ such that knowing $|e| - 1$ of the ...
8
votes
1answer
450 views
Approximation algorithms for Directed Minimum Cut with Cardinality Constraints
We would like to know whether there are any known approximation results for the cardinality constrained minimum $s$-$t$-cut on directed graphs. We weren't able to find any such result in literature.
...
3
votes
0answers
110 views
Earliest forbidden subgraph characterisation
I wonder, what was the first non-trivial graph class for which there was a forbidden (induced) subgraph characterisation ?
Of course, bipartite graph is one example but I am considering it as trivial ...
1
vote
1answer
59 views
Are there digraphs such that any two arborescences are arc-disjoint?
Let $D=(V,A)$ be a directed graph with root $r$.
An $r$-arborescence of $D$ is a subgraph such that for any $v\in V-r$, there is exactly one directed path from $r$ to $v$.
Hence an $r$-arborescence is ...
2
votes
0answers
74 views
Algorithm for computing the smallest subset of nodes to remove from a graph to make it a tree
I have encountered an interesting problem that I couldn't find any references to solve:
Determine the smallest subset of nodes that
need to be removed from an undirected graph to make it a tree.
...
0
votes
0answers
45 views
Matching of two weighted graphs allowing one-to-many mapping
I am looking for a heuristic for a graph matching problem as follows.
Given two graphs: $A$ (consisting of nodes $a_i$) and $B$ (consisting of nodes $b_i$). Typically the size of $B$ is larger than ...
10
votes
1answer
216 views
Efficient graph isomorphism for similar graph queries
Given the graph G1, G2 and G3, we want to perform isomorphism test F between G1 and G2 as well as G1 and G3. If G2 and G3 are very similar such that G3 is formed by deleting one node and inserting one ...
