NP-Complete refers to the hardest known problems within the complexity class NP. The "Traveling salesman problem" is one of the most widely known NP-Complete problem.

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On-call night scheduling algorithm

I work in a residence hall at my college as an RA, and each night we need two RAs to be on call (able to respond to incidents and emergencies). Each month, RAs submit the nights they cannot be on ...
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662 views

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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965 views

Shortest Paths with Resource Constraints

I have a directed acyclic graph and need to find the shortest paths with resource constraints. My constraint is that the paths selected must have a minimum number of a set resource consumed. ...
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Instance of subset sum problem

I have a problem which is a pretty clear instance of the subset sum problem: "given a list of Integers in the range [-65000,65000], the function returns true if any subset of the list summed is equal ...
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1answer
190 views

Is this optimal schedule task NPC?

I volunteered to write a program to schedule parent-teacher conferences. The principal wants parents to select 3 possible datetimes to visit their english and math teacher (at the same time). Once ...
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1answer
394 views

Sudoku polynomial algorithm?

I have a project to do for a complexity and problem solving course, and I've decided to base the project on Sudoku. From the research I've done, Sudoku is an NP-Complete problem (which is required for ...
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1answer
128 views

Bin-packing solution: what's going on with this?

I've attempted to implement a solution to a bin-packing-type problem, mostly in the way described by Dietrich Epp. I don't do Haskell yet so I wrote something in C++. For a wall width lower than a ...
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1answer
153 views

Is there any well-known NP-complete problem‍​​ that I can reduce a 'node placement' problem‍​​ to?

I have the following NP-complete problem: Given a set of locations in a N x N field, and a set of m nodes, and also a connectivity graph of the nodes (i.e. an undirected graph whose edges represent ...
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430 views

Is the problem of finding the chromatic number of this modified interval graph NP-Complete?

Few days ago I was working on interval graphs to solve the known problem of resource allocation, as we know there is a greedy approach that solves this problem (chromatic number) in polynomial time ...
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Given a collection of consumers competing for a limited resource, allocate that resource to maximize it's applicability

Sorry the question title isn't very clear, this is a challenging question to ask without providing a more concrete example. Consider the following scenario: I have a number of friends whose birthdays ...
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Steiner Minimal Trees and NP-completeness

What is the difference between the following Steiner trees: (Non-)Metric Steiner Minimal Tree, Euclidean Steiner Minimal Tree, Graph Steiner Minimal Tree, etc? Which of these are NP-complete and which ...
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PartitionProblem variation - fixed size of subsets

I have a problem which is a variation of the partition problem which is NP-complete. This is an optimization problem, not a decision problem. Problem: Partition a list of numbers into two subsets ...
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172 views

Reduction from Maximum independent set to Dominating set to prove the Dominating set is NP-complete

I know of the reduction from the Vertex cover to Dominating set. However, I was seeing if I could get a reduction from the maximum independent set problem straight to the Dominating set problem in ...
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Is this data sharing problem an NP problem?

Here is my problem: There are n peers in the P2P network, which request the same data block; And with some constraint. 1. Peers with its own upload bandwidth, and the average bandwidth is the size of ...
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29 views

How to demonstrate NP-complete

How to demonstrate that next problem is NP-complete. Given a matrix A and b a vector, find a nonnegative integer vector x satisfying the inequalities Ax ≤ b.
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Are virtually all major distributed computing projects attempting to solve problems in NP?

Here's a huge list of distributed computing projects: http://distributedcomputing.info/projects.html After a quick skim, I couldn't find any projects which weren't attempting to solve problems in NP ...
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63 views

All pairs shortest path with varying weights

Imagine you are given a weighted undirected complete graph with n nodes with non-negative weights Cij, where for i = j Cii = 0, and for i != j Cij > 0. Suppose you have to find the maximal shortest ...
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Shortest weight constrained path to Partition reduction

I am trying to prove NP-completness of a shortest weight constrained path problem. I have read multiple papers, but for love of god, cannot figure out how to show a reduction of this to partition ...
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156 views

Is this NP-Complete

My problem is similar to the problem here http://cs.stackexchange.com/questions/2244/need-a-np-complete-proof-on-an-example , but it is a little different. Here is my problem: There are three ...
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Why is this NP-complete puzzle showing fractal structure? [Visualizing Nonogram solution space]

Here's working code to visualize an NP-complete problem's solution space: Nonogram logic puzzles. It's very startling to see predictable structure across the growing solution space for problems that ...
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Directed HC to Undirected NPC

So I see that if I have a directed graph and there exists a Hamiltonian Cycle (HC) in it and then I want to transform that into an undirected HC I have to expand 1 vertex to 3 vertices... Why can't I ...
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19 views

Line Segment, NP-complete?

I'm working on a problem and I'm wondering if it is NP-hard. The idea is that there are a bunch of tiles placed in a 3-dimentional space, each of them has a line segment printed on it. When these ...
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26 views

set of vertex-disjoint cycles so that each vertex belongs to a cycle

Here I have a directed graph G. I need to to determine whether there exists a set of vertex-disjoint cycles so that each vertex belongs to a cycle. I'm not sure if this can be done in polynomial ...
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Can we reduce 3-CNF to a graph construction(where edges connected are given) to prove it's NP-Hard

Can someone reduce 3-CNF to Graph Construction(where the edges E connected are given). I tried proving it using clique and it works but can it also be done using 3-CNF?
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NP completeness of restricted X3C

Please help with proving NP complete (perhaps using fact that it is NP complete for k=3). Given the following: Finite set S and collection C of subsets of S of size 3 with each element of S ...
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Reduce a variant of Vertex Cover to original decision-version Vertex Cover

Consider the following variation (let us call it Q) on the Vertex Cover problem: Given a Graph G and a number K, we are asked if there is a k-cover of G so that it is the minimum cover. My question ...
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undirected graph with 2n vertices and positive integer

I have a undirected graph with 2n vertices and positive integer k<=|E|. Question: Can the nodes of G be partitioned into 2 disjoint sets U and W each of size n and such that the total number of ...
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370 views

Traveling Salesman - Found polynomial algorithm. Please approve

My name is Ilya Gazman, I think that I found polynomial algorithm to get exact solutions on Traveling Salesman problem. My implementation is from 5 steps: 1) Quick setup 2) Search for solution 3) ...
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63 views

Knapsack for each weight having multiple values - Is it possible to solve?

I have a 0/1 minimization Knapsack problem with a sum equality constraint. However, more interestingly, my weights can take values between 0:15. My question is, can I really solve this problem in ...
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62 views

Np completeness - Unable to decide the reduction approach

Given that the Hamiltonian cycle problem is NP complete, I want to prove that the following is NP complete. Given an undirected graph G(V,E), and s ant t belongs to V, does there exist a path from s ...
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229 views

Graph partitioning based on nodes and edges weights

I have a graph G=(V,E) that both edges and nodes have weights. I want to partition this graph to create equal sized partitions. The definition of the size of partition is sum(vi)-sum(ej) where vi is ...
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160 views

Heuristic algorithms for constrained memory DAG traversal scheduling

I am trying to solve a so-called "pebble game" problem to determine whether my large computation can fit into 4 TB of RAM. The original description of the pebble game is given in ...