# Questions tagged [planar-graphs]

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### Boruvka in planar graphs

On wikipedia it says that boruvka can be implemented in linear time for planar graphs, but I don't know how to prove that.
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### Decomposing planar Hamiltonian graphs

I have the following the statement and I have to prove whether it is true or not. Given a planar and Hamiltonian graph $\mathbb{G} = (V, E)$, show that we can partition $E = E_1 \cup E_2 = E$ so that ...
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### Finding closest edge to a point in a planar graph

I have a point location problem (in a planar graph) with a twist: rather then finding which region the point is located in, I would like to find the closest segment (edge) to a point, ideally with a <...
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### How to remove filaments from a planar graph?

I have a planar graph and I'm trying to implement this algorithm (https://geometrictools.com/Documentation/MinimalCycleBasis.pdf Chapter 4, page 3). For the filament F0(V4, V3, V2), that has one ...
23 views

### planar 1-in-3 sat described as a planar graph for independent set

Given a planar 1-in-3 sat formula, can someone reduce that formula into a graph that asks the question when ever there is an independent set for it, that's also planar?
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### Max independent set in planar graphs PTAS proof

I've been searching a few hours for a proof to Max independent set in planar graphs beeing in PTAS but I couldn't find anything, I'm searching for one without any reductions and I wonder if anyone ...
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### Clique-problem for planar graph

I have to show, that the clique problem in planar graphs is in P. I found the answer here here. However I don't get the conclusion This follows already from Kuratowski's theorem: a clique is at ...
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### Near Triangulation Planar Graph

This is the problem I am dealing with: Given a set P of n points in general position, let a graph G be defined as follows: The vertex set is P. Two vertices, a and b, are joined by an edge provided ...
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### Infinite sequence of graphs

http://jgaa.info/accepted/2011/HasheminezhadMcKayReeves2011.15.3.pdf Hello I stumbled upon this paper. On page $4/20$ the figure shows an infinite sequence of $5-$regular, connected planar graphs. ...
95 views

### Planar graphs of bounded degree: mixing time = cover time?

For many planar graphs of bounded degree (binary tree, lattice, cycle) the (1/4)-mixing time and the cover time are equal, up to log-factors. Is this always the case?
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### Planar Embedding with Some Nodes Constrained

I've read about basic planar-graph embedding and about embedding a planar graph onto a set of fixed points, but I was wondering how one might constrain the locations of some nodesāperhaps to a set of ...
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### Why graph planarity is important

What is the reason to study planar graphs and algorithms on such graphs (as well as algorithms allowing to check a graph's planarity)? Where in industry this knowlege is needed? I know that planarity ...
272 views

### FPT: Dominating Set on Planar Graphs (average degree is known)

I'm given an instance of a planar graph and should construct a FPT algorithm for dominating set. The task looks like this: Dominating Set on Planar Graphs Instance: A planar graph G and an integer ...
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### Planar cover of a rigid and non-planar graph

Let $G$ be a graph which is rigid and non-planar (e.g. $K_{3,3}$). Is it possible that $G$ has a planar cover? Are there any studies on this topic?
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### Treewidth of k x k square grid graphs

According to some slides I found on google, the treewidth of any $k \times k$ square grid graph $G$ is $tw(G) = k$. I just started researching about treewidth and tree decomposition, and for the most ...
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### Partitioning an undirected, unweighted, square planar graph paths that join certain pairs of nodes

I am trying to find a way to efficiently solve a puzzle that I play a lot by turning it into a graph partitioning problem (which is basically is in its actual form). I know that generally, graph ...
1k views

### Converting a non-planar graph to planar

Suppose that we have a non-planar graph $G$ which is undirected and connected. Our aim is to remove a set of edges and/or a set of vertices and convert make $G$ planar while keeping the connectedness. ...
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### Complete set of basic circuits for McLane's Theorem

I was assigned a project in which i had to implement some algorithms concerning graphs. The last one is the one described in the title. I have to make an algorithm that uses McLane's theorem (https://...
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### Maximum Weight Planarization of Size $n$ [duplicate]

Problem: Maximum Weight Planarization Given a weighted non-planar graph with $n$ vertices, and $m = \mathcal O\left(n^2\right)$ edges. Find the subgraph with $n$ nodes (but possibly removing edges to ...
218 views

### Finding one face in planar graph

Given a planar graph (represented using adjacency lists) we want to find a set of vertices which are around one (random) face. We know that the graph contains at least one triangle. How do we find ...
280 views

### A criterion for the planar graph to have unique dual

I get stuck with the following two criteria both about the uniqueness of plane embeddings of a given planar graph. The first one says that a planar graph admits unique plane embedding iff it is a ...
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### Closed walk in planar graphs that contains $k$ faces

Input: Planar graph $G$ and its embedding in sphere $\Pi$, edges $e, f \in E(G)$ and integer $k$. Output: A shortest closed walk (one among possibly many, if exists) in $G$ using $e$ and $f$ which ...
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### Planar TSP: no node insertion?

Since planar TSP with n nodes is NP-hard, we cannot simply find an optimal solution with n-1 nodes and then insert the remaining node at one of the solution's edges to find the optimal solution of the ...
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### Upper bound on the number of triangles in a planar graph

For any $n \geq 4$, I was able to prove that every Apollonian network has $3n - 8$ triangles. An Apollonian network is a planar graph defined by recursively subdividing a triangle by three smaller ...
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### Partitioning planar graphs without minimizing edge cuts

I am looking for an algorithm that, given an undirected, planar graph $G = (V,E)$ with node weights, meets the following conditions: Creates balanced (within some margin) $k$ partitions of $V$ ...
617 views

### Creating a 2D map of objects given a sparse matrix of pairwise distances

I have a set of points on the two-dimensional plane, but their locations are not given to me. I am given the distance between some pairs of the points. However, I only know these differences for ...
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### Is there a fast, “partial planarization” algorithm for non-planar graphs?

On "partial planarization" I understand an algorithm, which tries to reach an optimal, or nearly-optimal solution for non-planar graphs. For example, which minimizes the number of the crossing edges (...
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### Algorithm to generate all planar graphs

Is there an algorithm which provides a sequence of all simple planar graphs, unique by graph isomorphism? For instance: first all planar graphs with 1 node, then all planar graphs with 2 nodes, etc. ...