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Graph theory is the study of graphs, mathematical structures used to model pairwise relations between objects.

9
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0answers
86 views

Graphs with minimal-size induced subgraphs

I consider undirected graphs $G = (V, E)$ for which I write $\text{n}(G) := |V|$ the number of vertices and $\text{m}(G) := |E|$ the number of edges. For $d \in \mathbb{N}$, I say that $G$ is $d$-...
3
votes
0answers
98 views

A variant of hitting set: finding a matching to hit all edge sets

In general, the hitting set problem is given a family $\cal S$ of sub-sets, $\{S_1, \cdots, S_h\}$, and a universal set $U = \bigcup_{i\in [1,h]} S_i$. It asks for a minimum set $H \subseteq U$ ...
1
vote
1answer
51 views

Minimum graph cut with constraints

Given an undirected acyclic raph $G = \{V,E\}$, with each edge $e$ having weight $c_e$in the range $[-\infty, +\infty] $, I want to compute a partition of the graph into $N$ disjoint sets $G_i, i=1,......
6
votes
1answer
176 views

Paths of length $p$ in a Graph, $p$ a prime

I came across the following decision problem, for which I wondered whether anybody of you came across a similar problem and can give me some insight on its nature/complexity. Given as input a ...
-2
votes
1answer
89 views

Finding Cheapest n-Path [closed]

Given a weighted directed acyclic graph, how can I find the cheapest path from an Origin Vertex to a Destination Vertex which ...
4
votes
1answer
94 views

Fast algorithm to find a maximum connected subgraph of k vertices

Given an undirected graph $G = (V, E)$ and a function $f: 2^V \to \mathbb{R}^+,$ where $2^V$ is the set of all subsets of $V$. Find a connected subgraph $T = (V_T, E_T)$ of k vertices such that $f(V_T)...
6
votes
0answers
85 views

Ramsey number for path in a colored tournament

I am looking about the following Ramseyish theorem with additional structure on tournament (see [1]). For all number of colors $k$, there exists $n=T(k)$ such that all tournaments of size $n$ ...
-4
votes
2answers
83 views

Looking for an algorithm to construct a graph from two subgraphs

I am looking for an algorithm to construct a graph from two subgraphs. The problem is as following: Given two graphs g1(V, E) and g2(V, E), find a graph G(V, E) where V(g1) ⊆ V(G), V(g2) ⊆ V(G), E(g1)...
3
votes
0answers
61 views

Mutually exclusive replacement paths, an existing problem?

A replacement path is a simple path allocated to an edge $e \in G$ that connects the endpoints of $e$ in $G \setminus \{e\}$. The problem An undirected graph $G$ is given and the task is to allocate ...
-1
votes
1answer
51 views

How to make any graph 2-degenerate?

I have to show a PPT(polynomial time reduction) from 'Colorful graph Motif' to '2-Degenerate Steiner Tree'. As input graph should be 2-degenerate, but here is normal graph G (that is, basically an ...
0
votes
0answers
44 views

Complexity of extending $P_4 $-partition of cubic graphs

This is a question I posted on MathOverflow before but never got an answer. I am cross-posting it here. Surprising phenomena occurs when we want to extend a partial solution of some easy problems. We ...
4
votes
2answers
132 views

Check if graph stays connected after edge swap

Checking whether a (simple, undirected) graph is connected can be done in linear time in the number of edges. What I am looking for is a more efficient way of checking whether it stays connected after ...
0
votes
0answers
29 views

Reduce maximum capacity simple cycle to maximum capacity minimum cost cycle

Consider the following problems $(A)$: Let $G=(V,E)$ a non-directed graph, a capacity function $u:V\to\mathbb Q_+\cup\{0\}$ and $m \in \mathbb Q_+$. Decide if there exists a simple cycle such that ...
3
votes
1answer
100 views

What exactly is Lawler's modification to Yen's algorithm and how does it work?

I recently read about Yen's algorithm, I understand the algorithm and it seems correct, however Wikipedia mentions that there exists "Lawler's modification" to the algorithm, which is described as ...
4
votes
1answer
89 views

Probability of a $k$-path in a random graph

Assume that $G\in G(n,p)$; if $p=\frac{\ln n +\ln \ln n +c(n)}{n}$, the following fact is well known: \begin{eqnarray} Pr [G\mbox{ has a Hamiltonian cycle}]= \begin{cases} 1 & (c(n)\...
4
votes
1answer
258 views

Minimum Union-Sum Cost Path

I have a minimum cost path selection problem that is different from the usual shortest path in that each type of cost is accounted only once in the total cost of the path if multiple edges on the path ...
1
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0answers
35 views

Random Multigraph ER-like model?

I was looking into multigraphs recently and I couldn't find a simple "goto" model for generating random multigraphs along the lines of the ER model of simple graphs. Specifically, I was hoping to find ...
-1
votes
1answer
48 views

NP-Complete graph problems where a special vertex is given as input?

I am currently working on a graph theory problem where the instance includes a graph and a special vertex in the graph. I am trying to prove the NP-completeness of the problem as well as explore ...
1
vote
0answers
42 views

k-center 2.0: A stronger k-center condition

Given an unweighted, undirected graph, we can use the classical 2-appx for $k$-center to select a set $S$ of centers such that every vertex is within a distance of 2 of some center in $S$. Note that ...
0
votes
0answers
19 views

explicit UES for $D$-regular graphs over $N$ vertices through the line graph

First of all observe that if we have $G$, a $D$-regular graph over $N$ vertices that is equipped with a consistent labeling $\ell$ then we can induce a consistent labeling for $L(G)$ the line graph of ...
1
vote
1answer
102 views

Total flow using minimum number of edges on a bipartite network

If I have a set of sources $S$ with total capacity $C$ and a set of sinks $T$ with the same capacity $C$, but not necessarily the same cardinality, is there an efficient way to find the minimum number ...
5
votes
1answer
127 views

Lower bound for triangle-free graphs

I was reading a set of notes where it says It can be shown that $\Omega(n^2)$ space is needed for one-pass algorithms to determine if an (unweighted, undirected) graph $G$ with $n$ nodes contains ...
1
vote
0answers
35 views

Counting vertex covers on a chain of k nodes that do not contain a sub-chain of length >=3

By a "chain of k nodes", I mean k nodes lined up like a linked-list: o-o-o.....-o . By "do not contain a sub-chain of length >=3", I mean that no cover should contain two edges that shares a node. ...
1
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0answers
35 views

Planarity testing of directed graph and 3d grid

I wonder if there exist definitions (and known algorithms) of planarity testing for the following case: 1- A directed graph let $G=(V=\{1,\ldots,n\},E)$ be a directed graph. Assume $e_{ij} =(v_i,...
4
votes
1answer
169 views

How hard is it to determine the chromatic number of a unit distance graph?

For example, is it NP-complete to decide whether a unit distance graph is 3-colorable?
5
votes
2answers
177 views

The chromatic number of a graph as a functor

I was fooling around with some concept and was wondering if this viewpoint is explored at all. Let INJ-GRAPH be the subcategory of graphs (with morphisms as homomorphisms) whose morphisms consist only ...
5
votes
0answers
145 views

Can graphons be useful outside of extremal graph theory?

I was recently introduced to the notion of a Graphon ([Quick introduction], [Original definition]) and I have been fascinated by the idea behind them and the way they combine fields such as graph ...
6
votes
1answer
131 views

Partition edges into edge disjoint walks

Consider an undirected graph $G=(V,E)$ and two sequences of $k$ vertices $S=s_1,\ldots,s_k$ and $T=t_1,\ldots,t_k$. A set of $k$ walks is called a $(S,T)$-walk partition if the walks form a ...
3
votes
0answers
105 views

Is 3-coloring bounded degree graphs subexponential: $O(\exp{(\sqrt{n}\log^2{n})})$? [closed]

We got an argument that 3-coloring bounded degree graphs is subexponential with complexity $O(\exp{(\sqrt{n}\log^2{n})})$. The treewidth of a planar graphs on $n$ vertices is $O(\sqrt{n})$ and 3-...
4
votes
1answer
146 views

Can $L=SL$ be shown with the replacement product instead of the zig-zag product?

(This is a bit of follow-up to https://cstheory.stackexchange.com/posts/comments/93266 but is a distinct enough question I though it should be on its own.) In Omer Reingold's logspace USTCON ...
6
votes
1answer
130 views

Path in a graph with durations [closed]

I have the following problem: given a directed graph $G=(V,E,d)$, where $d:V\to\mathcal{I}(\mathbb{Q}_0^+\cup\{+\infty\})$ (here $\mathbb{Q}_0^+$ denotes the set of non-negative rationals and $\...
3
votes
0answers
72 views

PTIME or NP-Hardness of stochastic objective function

I will begin by linking a previous post where I asked a general question for a stochastic setting which I describe below. It turns out that my "proof" for a restricted case had a mistake and there is ...
4
votes
0answers
77 views

Showing hardness of maximizing stochastic objective function over graph

Consider a graph $G = (V, E)$ with $n$ vertices and $m$ edges. Each vertex $v_i$ can take positive value $a_i$ with probability $p_i$ and value $0$ with probability $1-p_i$. The challenge is to ...
3
votes
1answer
107 views

Results/concepts that also proved useful outside of their “home areas”

There are some results/concepts in TCS which are used in areas other than the "home area" where they emerged. For example, NP-completeness has complexity theory as its home area, but it is also used ...
1
vote
2answers
149 views

Is perfect matching for bipartite graph with no cycles unique?

Given a balanced bipartite graph that satisfies Hall's theorem (is non singular) then it shown that it has at least one perfect matching. My question is if the balanced bipartite graph is also ...
1
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0answers
45 views

Generating random labelled trees

I am looking for a simple rejection-free algorithm to uniformly sample random labelled trees (i.e. to generate each of them with the same probability). One possibility is to generate Prüfer sequences ...
1
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0answers
73 views

Is NP-complete the existence of paths of a given length in a directed graph? [closed]

Given a directed graph G= (V,E), a pair of vertices s and t, a natural number K encoded in binary, whether the problem to decide there exists a path (not necessarily simple) from s to t of length K is ...
-1
votes
1answer
84 views

Closeness Centrality for Weighted Graphs

In order to determine the Closeness Centrality for a vertex u in a graph, you compute the shortest path between u and all other vertices in the graph. The centrality is then given by: $C(u) = \frac{1}...
0
votes
0answers
44 views

Path Finding: single-source, multi-path, multi-target, and max-depth - approaches and application

Background Definitions (as used here): $\qquad$single-source: for path finding, an algorithm is single-source if it searches from a given node. $\qquad$multi-target: for path finding, an ...
1
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0answers
59 views

Finding a Minimal k-Subgraph

Given a complete, positively weighted, bidirectional graph with $n$ nodes without self-loops. Hence the corresponding adjacency matrix $A$ is positive, symmetric, and has zero main diagonal. I am ...
0
votes
1answer
86 views

Is there any better than (2/k)-approximation algorithm for Independent Set in Coloring graph?

I would like to know any results in terms of approximation algorithm about Maximum weight Independent Set problem in coloring graph. Input: Given a graph G with non-negative vertex weights and ...
6
votes
0answers
71 views

Complexity of bounded degree full contraction

This paper defines the problem $\mathrm{B{\scriptsize OUNDED} \ D{\scriptsize EGREE}\ C{\scriptsize ONTRACTION}}$ as follows: Instance: A graph $G$ and two integers $d$ and $k$. Question: Is there a ...
2
votes
0answers
100 views

Hardness of Approximation for minimum path cover in an undirected graph?

Given an undirected graph $G = (V,E)$, a path cover is a set of disjoint paths such that every vertex $v\in V$ belongs to exactly one path. The minimum path cover problem consists of finding a path ...
1
vote
1answer
96 views

How good of an approximate 2-coloring can you get of the halved cube graph?

We say that a 2-coloring $col : V_G \rightarrow \{0, 1\}$ of a graph $G$ is $\epsilon$-approximate if $Pr_{(w, v) \in E_G}(col(w) \neq col(v)) \geq \epsilon$. For every $n$, what is the maximum $\...
2
votes
1answer
95 views

What is the name of a graph with local clustering coefficients equal to zero?

I am struggling to find in literature a name for a kind of graph where all local clustering coefficients are equal to zero (or, at least, bounded). For instance, domino, a subset of cacti and all ...
0
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0answers
42 views

Find the maximum induced (weighted) subgraph with edge weights greater than some minimum

I have a (fully connected) weighted undirected graph. I want to find a maximal induced subgraph whose edge weights are all above some minimum value. Or, if not a maximal subgraph, then with some ...
10
votes
2answers
207 views

Common insights into hypothetical complexity of graph problems

I came across two examples of hypothetical hardness of some graph problems. Hypothetical hardness means that refuting some conjecture would imply the NP-completeness of the respective graph problem. ...
2
votes
1answer
81 views

Is Eulerian Path (or Eulerian Cycle) definable in Monadic Second Order Logic?

Does there exist a monadic second order logic formula which is satisfied by a graph if and only if it has an Eulerian path (or Eulerian cycle). I am looking for properties of graphs which are ...
15
votes
1answer
388 views

What is the complexity of this graph problem?

Given a simple undirected graph $G$, find a subset $A\neq \emptyset$ of vertices, such that for any vertex $x\in A$ at least half of the neighbors of $x$ are also in $A$, and the size of $A$ is ...
0
votes
0answers
26 views

Partitions of regular graphs with upper bounds on bipartition width

Are there efficient graph partitioning algorithms with guaranteed upper bounds on the bipartition width in terms of the total number of vertices of the graph, or another non-spectral quantity (...