A minimum spanning tree (MST) or minimum weight spanning tree is a spanning tree of a connected, undirected graph with the least possible weight.

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Kruskal vs Prim

I was wondering when one should use Prim's algorithm and when Kruskal's to find the minimum spanning tree? They both have easy logics, same worst cases, and only difference is implementation which ...
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How to find maximum spanning tree?

Does the opposite of Kruskal's algorithm for minimum spanning tree work for it? I mean, choosing the max weight (edge) every step? Any other idea to find maximum spanning tree?
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Updating a Minimum spanning tree when a new edge is inserted

I've been presented the following problem in University: Let G = (V, E) be an (undirected) graph with costs ce >= 0 on the edges e ∈ E. Assume you are given a minimum-cost spanning tree T in G. ...
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All minimum spanning trees implementation

I've been looking for an implementation (I'm using networkx library.) that will find all the minimum spanning trees (MST) of an undirected weighted graph. I can only find implementations for ...
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What is a minimum bottleneck spanning tree ?

A minimum bottleneck spanning tree of a weighted graph G is a spanning tree of G such that minimizes the maximum weight of any edge in the spanning tree. A MBST is not necessarily a MST(minimum ...
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graph - Is Minimum Spanning Tree afraid of negative weights?

This is a followup question of graph - Why most graph algorithms do not adapt so easily to negative numbers? I think shortest path has problem with negative weights, because it adds up all weights ...
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Modeling a graph in Python

I'm trying to solve a problem related to graphs in Python. Since its a comeptitive programming problem, I'm not using any other 3rd party packages. The problem presents a graph in the form of a 5 X ...
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803 views

A fast algorithm for minimum spanning trees when edge lengths are constrained?

Suppose that you have a directed graph with nonnegative, integer edge lengths that are in the range 0 to U - 1, inclusive. What is the fastest algorithm for computing a minimum spanning tree of this ...
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A two way minimum spanning tree of a directed graph

Given a directed graph with weighted edges, what algorithm can be used to give a sub-graph that has minimum weight, but allows movement from any vertex to any other vertex in the graph (under the ...
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Will a minimum spanning tree and shortest path tree always share at least one edge?

I'm studying graph theory and I have a question about the connection between minimum spanning trees and shortest path trees. Let G be an undirected, connected graph where all edges are weighted with ...
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Update minimum spanning tree with modification of edge

A graph (positive weight edges) with a MST If some edge, e is modified to a new value, what is the best way to update the MST without completely remaking it. I think this can be done in linear time. ...
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Differences between Minimum Spanning Tree and Shortest Path Tree

Here is an excise: Either prove the following or give a counterexample: (a) Is the path between a pair of vertices in a minimum spanning tree of an undirected graph necessarily the ...
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An algorithm to see if there are exactly two MSTs in a graph?

I have an undirected connected graph G. I wish to find an algorithm that return true if there are at least 2 MSTs. What if I want to see if there are exactly 2 MSTs?
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Efficient minimal spanning tree in metric space

I have a large set of points (n > 10000 in number) in some metric space (e.g. equipped with Jaccard Distance). I want to connect them with a minimal spanning tree, using the metric as the weight on ...
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Is there a minimum spanning tree that does not contain the min/max weighted edge?

If we have an (arbitrary) connected undirected graph G, whose edges have distinct weights, does every MST of G contains the minimum weighted edge? is there an MST of G that does not contain the ...
7
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1answer
776 views

Complexity of Prims Algorithm using Priority Queue?

I am using an adjacency matrix, priority queue is the data structure. By my calculation, complexity is V^3 log V: While loop: V Checking adjacent Vertices: V Checking the queue if the entry is ...
7
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Implementing Kruskal's algorithm in Ada, not sure where to start

With reference to Kruskal's algorithm in Ada, I'm not sure where to start. I'm trying to think through everything before I actually write the program, but am pretty lost as to what data structures I ...
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How to update element priorities in a heap for Prim's Algorithm?

I am studying Prim's Algorithm. There is a part within the code the next vertex across the cut will be coming to the set of the vertices belonging to the MST. While doing that, we also have to ...
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The fastest minimum spanning tree algorithm

http://en.wikipedia.org/wiki/Minimum_spanning_tree I'm looking to benchmark my minimum spanning tree algorithm against the best of the best. Does someone know where I can find a C++ implementation of ...
6
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1answer
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Algorithm to find minimum spanning tree of chosen vertices

One can use Prim's algorithm or Kruskal's algorithm to find the minimum spanning tree/graph of a collection of vertices/nodes and edges/links. What I want though, is an algorithm that finds the ...
6
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470 views

Graph Has Two / Three Different Minimal Spanning Trees ?

I'm trying to find an efficient method of detecting whether a given graph G has two different minimal spanning trees. I'm also trying to find a method to check whether it has 3 different minimal ...
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2answers
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Prims Algorithm Total Running time!

"Thus, the total time for Prim's algorithm is O(V lg V + E lg V) = O(E lg V), which is asymptotically the same as for our implementation of Kruskal's algorithm." From ...
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Faster second-best MST algorithm?

I am struggling with this. We can get MST using Kruskal's algorithm or Prim's algorithm for the MST. And for "second-best" MST, I can: first get MST using either of the algorithm mentioned above. ...
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1answer
632 views

Determine if a given weighted graph has unique MST

I'm looking for an algorithm (or any other way) to determine if a given weighted graph has unique MST (Minimum spanning tree) in O(ElogV)? I don't know anything about the weights (e.g. weight(e1) != ...
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248 views

Do minimum depth, spanning trees algorithms exist?

Im currently optimizing electrical grid planning and the MST doesnt solve the problem well, because if the conection to the main grid is in a radial point all the power has to flow through one edge ...
5
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1answer
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Creating a weighted undirected graph in “igraph” in C/C++

Problem: I want to make a weighted undirected graph from adjacency matrix stored in a .csv file using igraph and then do the minimum spanning tree and some other algorithms on it. I started with ...
5
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325 views

How to find a “minimal spanning set” for a collection of regular expressions?

CONTEXT: I have a smallish (currently less than 100) but growing collection of Regular Expressions, and I want to optimize the process of determining for a given text string which of the REs in my ...
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Algorithm to find MST in a huge complete graph

Let's assume a complete graph of > 25000 nodes. Each node is essentially a point on a plane. It has 625M edges. Each edge has length which should be stored as a floating point number. I need an ...
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How can I write a MST algorithm (Prim or Kruskal) in Haskell?

I can write both Prim's and Kruskal's algorithms to find a minimum spanning tree in C++ or Java, but I want to know how to implement them in Haskell with O(mlogm) or O(mlogn) (pure functional programs ...
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Use Dijkstra's to find a Minimum Spanning Tree?

Dijkstra's is typically used to find the shortest distance between two nodes in a graph. Can it be used to find a minimum spanning tree? If so, how? Edit: This isn't homework, but I am trying to ...
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Find all critical edges of an MST

I have this question from Robert Sedgewick's book on algorithms. Critical edges. An MST edge whose deletion from the graph would cause the MST weight to increase is called a critical edge. Show ...
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Finding a Minimum Spanning Tree from an Adjacency List where the Adjacency List is in a string array using Prims Algorithm

So I need some help coming up with a way to find a Minimum spanning tree. Suppose I have my graph in the form of an adjacency list: A 2 B 12 I 25 B 3 C 10 H 40 I 8 C 2 D 18 G 55 D 1 E 44 E 2 F 60 G ...
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Find whether a minimum spanning tree contains an edge in linear time?

I have the following problem on my homework: Give an O(n+m) algorithm to find that whether an edge e would be a part of the MST of a graph (We are allowed to get help from others on this ...
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How to find total number of minimum spanning trees in a graph?

I dont want to find all the minimum spanning trees only how many of them are there, here is the method i considered: Find one minimum spanning tree using prim's or kruskal's algorithm and the find ...
4
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190 views

Max weight euclidean spanning tree

A maximum spanning tree can be found by running kruskal's algorithm(just changing the edges function and considering the max weight edges first). I am interested in finding the max weight euclidean ...
4
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1answer
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dynamic minimum spanning tree

I want to make a dynamic minimum spanning tree. I have an existing MS tree over n vertices and I add one more vertex and edges to all the existing vertices from this new vertex. How can I update the ...
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finding all minimal spanning trees [duplicate]

Possible Duplicate: All minimum spanning trees implementation How can I find all minimum spanning trees in an undirected graph in an efficient way?
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Guarantee about edge not being part of a minimum spanning tree

I was solving exercises from the Algorithm Design book by Kleinberg and Tardos and came across this not-so-easy (to me) problem on finding a guarantee that an edge will never belong to the MST of a ...
4
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Check if edge is included in SOME MST in linear time (non-distinct values)

I am working on an algorithm to check if a given edge is included in one of all possible mst's. For this question, we are considering non-distinct values and our edge e connects vertices A & B. ...
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A 2-approximation algorithm for Vertex-Cover problem using “Spanning Tree”

I have seen a question on 2-approximation algorithm for Vertex-Cover problem(VC, known Np-Complete problem), and i don't know the answer. The problem is the following : Find a 2-approximation ...
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Mathematica function turns red, does not work

I'm trying to find the minimum spanned tree using Mathematica and I want to use the MinimumSpanningTree function from Combinatorica. I'm using the following code. Needs["Combinatorica`"] ...
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Time complexity of Prim's MST Algorithm

Can someone explain to me why is Prim's Algorithm using adjacent matrix result in a time complexity of O(V2)?
3
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2answers
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Graph Minimum Spanning Tree using BFS

This is a problem from a practice exam that I'm struggling with: Let G = (V, E) be a weighted undirected connected graph, with positive weights (you may assume that the weights are distinct). ...
3
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3answers
738 views

Time complexity of creating a minimal spanning tree if the number of edges is known

Suppose that the number of edges of a connected graph is known and the weight of each edge is distinct, would it possible to create a minimal spanning tree in linear time? To do this we must look at ...
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MST with modification

Can anyone think of a way to modify Kruskal's algorithm for a minimum spanning tree so that it must include a certain edge (u,v)?
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Algorithms for bidirectional graphs

Say I have a graph (network) of nodes, with weightings on the following: 1. travelling one way on a link between two nodes. 2. travelling the other way on a link between two nodes (these might be ...
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1answer
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Can I use Prim's algorithm instead of Dijkstra's to find shortest path?

I have been fighting all day in understanding Dijkstra's algorithm and implementing with no significant results. I have a matrix of cities and their distances. What I want to do is to given an origin ...
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Stuck on solving the Minimal Spanning Tree problem

I have reduced my problem to finding the minimal spanning tree in the graph. But I want to have one more constraint which is that the total degree for each vertex shouldnt exceed a certain constant ...
3
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1answer
891 views

Detecting whether an edge is the heaviest edge in a cycle

So it seems that determining whether an edge is in a minimum spanning tree can be reduced down to the question of whether the edge is the heaviest edge of some cycle. I know how to detect whether an ...
3
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All pairs shortest paths with dynamic programming

All, I am reading about the relationship between all pairs shortest path and matrix multiplication. Consider the multiplication of the weighted adjacency matrix with itself - except, in this ...