# Greedy Graph Concept

Here is my problem:

Given `T={CTAGC, GAGCG, AGCGG, CGGAG}`, using a greedy algorithm, the superstring `S` will be `GAGCGGAG`.

Here is the pseudocode for my solution:

``````Algorithm greedy
Sort edges in decreasing weight order (weight mean the number of overlap between 2 substrings)
Initialize the Set empty
For each edge in this order
If the edge does not form a cycle
and the edge does not start or end at the same node as another edge in the Set
then
add the edge to the current Set
End for
End Algorithm
``````

From `S`, the combination of triplets will be given as `s = {GAG, AGC, GCG, CGG, GGA, GAG}`.

The `GAG` is repeated.

If using `s` to retrieve the superstring by using Hamiltonian method, would the repeated words will be used or omitted?

If the repeated word is omitted, then `GAG`, `AGC`, `GCG`, `CGG`, `GGA` constructed back will become `GAGCGGA`.

So, the greedy method and Hamiltonian method will provide different results in the superstring.

Why are they different? In my research, all the examples I found showed that there are no repeated words in the combination, so if I reconstruct the superstring using the Hamiltonian method, the result of the greedy and Hamiltonian methods will be the same. But what about the repeated words?

Here is a link to my resource on the subject.

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I don't know what's your greedy algorithm? and why you say Hamiltonian way, As I know Minimum Super String approximation algorithms uses cycle cover, and also it can be approximated by TSP. see my presentation at authorstream.com/Presentation/… –  Saeed Amiri Oct 12 '11 at 6:51
@Saeed Amiri, Hamiltonian way can be used to solved the sequencing hybridization. Let say given k-mer of strings, construct shortest common superstring (SCS). What is the different between the way of using greedy and hamiltonian in constructing SCS? –  rock Oct 12 '11 at 7:15
@Saeed Amiri, i have added the greedy algorithm...may i know why u think Hamiltonian path is not a good answer? –  rock Oct 12 '11 at 7:49
Ok, I can't see your google book reference (google bounded our counry and now i can't use any vpn cause of some problems) but one question, what's the usage of 3ple for you? what problem if they have some redundant items? –  Saeed Amiri Oct 12 '11 at 8:01
I think you talk about TSP not HP, because HP doesn't care about length of items, Also TSP is near to optimal solution (at most one extra string will be selected and if the number of nodes are big enough this doesn't cause to any problem, In fact it's 1 approximation.) –  Saeed Amiri Oct 12 '11 at 8:04