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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What is an NP-complete problem?

What is an NP-complete problem? Why is it such an important topic in computer science?
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What's “P=NP?”, and why is it such a famous question? [closed]

The question of whether P=NP is perhaps the most famous in all of Computer Science. What does it mean? And why is it so interesting? Oh, and for extra credit, please post a proof of the statement's ...
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Tricky programming problem that I'm having trouble getting my head around

First off, let me say that this is not homework (I am an A-Level student, this is nothing close to what we problem solve (this is way harder)), but more of a problem I'm trying to suss out to improve ...
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Is this problem NP, and does it have a name?

This problem came up in the real world, but I've translated it into a more generic "textbook-like" formulation. I suspect it is NP, but I'm particularly interested in knowing if it has a name or is ...
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Algorithm to Divide a list of numbers into 2 equal sum lists

There is a list of numbers. The list is to be divided into 2 equal sized lists, with a minimal difference in sum. The sums have to be printed. #Example: >>>que = [2,3,10,5,8,9,7,3,5,2] ...
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Is it correct to ask to solve an NP-complete problem on a job interview? [closed]

Today there was a question on SO, where the author was given an NP-complete problem during an interview and he obviously hadn't been told that it was one. What is the purpose of asking such ...
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how were the first NP-complete problems shown to be NP-complete?

From the wikipedia entry on NP-Complete: "The easiest way to prove that some new problem is NP-complete is first to prove that it is in NP, and then to reduce some known NP-complete problem to it" ...
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Are all scheduling problems NP-Hard?

I know there are some scheduling problems out there that are NP-hard/NP-complete ... however, none of them are stated in such a way to show this situation is also NP. If you have a set of tasks ...
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Non-exponential solution to maze problem?

Given a n*n-sized multi-headed acyclic graph where each node has at most three children and three parents, is there an non-exponential algorithm to identify whether a n-length path exists where no two ...
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Is the board game “Go” NP complete?

There are plenty of Chess AI's around, and evidently some are good enough to beat some of the world's greatest players. I've heard that many attempts have been made to write successful AI's for the ...
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Algorithm to find which numbers from a list of size n sum to another number

I have a decimal number (let's call it goal) and an array of other decimal numbers (let's call the array elements) and I need to find all the combinations of numbers from elements which sum to goal. ...
10
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2answers
633 views

Algorithm/approximation for combined independent set/hamming distance problem

Input: Graph G Output: several independent sets, so that the membership of a node to all independent sets is unique. A node therefore has no connections to any node in its own set. Here is an example ...
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Find set of numbers in one collection that adds up to a number in another

For a game I'm making I have a situation where I have a list of numbers – say [7, 4, 9, 1, 15, 2] (named A for this) – and another list of numbers – say [11, 18, 14, 8, 3] (named B) ...
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How to find what numbers in a set add up to another given number?

Here's a problem that I seem to be running into working with an accounting system. I have a set of transactions, but their sum does not equal the amount that the accounting department thinks that it ...
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8answers
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Find the best combination from a given set of multiple sets

Say you have a shipment. It needs to go from point A to point B, point B to point C and finally point C to point D. You need it to get there in five days for the least amount of money possible. There ...
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Possible NP-complete problem?

I'd just like someone to verify whether the following problem is NP-complete or if there is actually a better/easier solution to it than simple brute-force combination checking. We have a sort-of ...
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Is this “Valid mathematical expression” problem P, or NP?

This question is purely out of curiosity. I am off school for the summer, and was going to implement an algorithm to solve this just for fun. That led to the above question, how hard is this problem? ...
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9answers
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Have you ever had a business requirement that turned out to be an NP-Complete problem?

NP-completeness seems to me like one of those things that's mostly just theoretical and not really something you'd run into in a normal work environment. So I'm kind of curious if anyone's ever run ...
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how to find the least number of operations to compute x^n

here is the problem from ACM International Collegiate Programming Contest Asia Regional Contest, Yokohama, 2006-11-05 Starting with x and repeatedly multiplying by x, we can compute x^31 ...
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NP-complete knapsack

I saw this ECLiPSe solution to the problem mentioned in this XKCD comic. I tried to convert this to pure Prolog. go:- Total = 1505, Prices = [215, 275, 335, 355, 420, 580], ...
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1answer
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List of problems that are in general NP-hard but have polynomial-time solution in planar graphs?

I encountered many problems that can be formulated as graph problem. It is in general NP-hard but sometimes the graph can be proved to be planar. Hence, I am interested in learning these problems and ...
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Is this variant of the subset sum problem easier to solve?

I have a problem related to the subset sum problem and am wondering if the differences make it easier, i.e. solvable in a reasonable amount of time. Given a value V, a set size L, and a sequence of ...
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The subsets-sum problem and the solvability of NP-complete problems

I was reading about the subset-sums problem when I came up with what appears to be a general-purpose algorithm for solving it: (defun subset-contains-sum (set sum) (let ((subsets) (new-subset) ...
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4answers
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Is this problem np-complete?

Say there is a line of x bins filled with trinkets (random amount), in plain-sight (you can see how many trinkets there are in each bin). Now there are two players who can when it's their turn pick a ...
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3answers
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Best-case Running-time to solve an NP-Complete problem?

What is the fastest algorithm that exists up with to solve a particular NP-Complete problem? For example, a naive implementation of travelling salesman is O(n!), but with dynamic programming it can be ...
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Solving an extension of the Shortest Hamiltonian Path

I was thinking about an extension to the Shortest Hamiltonian Path (SHP) problem, and I couldn't find a way of solving it. I know it is NP-complete, but I figured I'd ask here for ideas, since I do ...
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1answer
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Maximum non-overlapping intervals in a interval tree

Given a list of intervals of time, I need to find the set of maximum non-overlapping intervals. For example, if we have the following intervals: [0600, 0830], [0800, 0900], [0900, 1100], [0900, ...
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1answer
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Is minimization of boolean expressions NP-Complete?

I know that boolean satisfiability is NP-Complete, but is the minimization/simplification of a boolean expression, by which I mean taking a given expression in symbolic form and producing an ...
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Algorithms to find the number of Hamiltonian paths in a graph

I'm trying to solve a slightly modified version of the Hamiltonian Path problem. It is modified in that the start and end points are given to us and instead of determining whether a solution exists, ...
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Optimizing a Parking Lot Problem. What algorithims should I use to fit the most amount of cars in the lot?

What algorithms (brute force or not) would I use to put in as many cars (assume all cars are the same size) in a parking lot so that there is at least one exit (from the container) and a car cannot be ...
5
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3answers
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minimal multiplications vs a set-cover issue

I have a set I ={P1, P2, ..., Pm} , and n finite subsets of I, denoted by R1,R2,...,Rn as follows: R1 = {P1, P2} R2 = {P2, P4} R3 = {P2, P3, P4} R4 = {P1, P2, P4} .... where Pi denotes an ...
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Subset Inference NP-complete?

Consider the following problem: There are N coins numbered 1 to N. You can't see them, but are given M facts about them of the form: struct Fact { set<int> positions int num_heads } ...
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Minimal addition-chain exponentiation

I know it has been proven NP-complete, and that's ok. I'm currently solving it with branch and bound where I set the initial upper limit at the number of multiplications it would take the normal ...
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1answer
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Compilers that translate verification algorithms into SAT problems

The proof that SAT is NP-complete is a constructive proof, so it should be possible to implement it as a program. Has anyone done this? I'm looking for a program (a compiler), that takes as input a ...
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Is this combinatorial optimization problem NP-hard?

I working on a combinatorial optimization problem that I suspect is NP-hard, and a genetic algorithm has been working well with our dataset. We're a research group and plan to publish our results in ...
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How to tell if greedy algorithm suffices for finding minimum coin change?

The minimum coin change problem is an NP-complete problem but for certain sets of coins the greedy algorithm (choose largest denominations first) works. Given a set of integers denoting coin-values, ...
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Comparing syntax trees modulo alpha conversion

I am working on a compiler/proof checker, and I was wondering, if I had a syntax tree such as this, for example: data Expr = Lambdas (Set String) Expr | Var String | ... if there were a ...
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find the maximum number of vertex-disjoint paths in a graph with a constraint

Given a undirected graph G=(V,E), each edge is associated with a non-negative value. How to find the maximum number of vertex-disjoint paths from s to t on the graph G, with a constraint that the sum ...
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NP-Complete vs. NP-hard [closed]

If a problem A known to be NP-Complete can be reduced to another problem B in polynomial time then B is (A) NP-Complete (B) NP-hard Nothing is given about problem B whether it is in NP or not. I'm ...
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np-completeness in the bounded degree spanning tree

I understand why the Bounded Degree Spanning Tree is considered NP Complete with a degree or 2 (it is an instance of the Hamiltonian Path Problem), but I do not understand why this applies to degrees ...
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What is the difference between a 'combinatorial algorithm' and a 'linear algorithm'?

Or rather, what is the definition of a combinatorial algorithm and a linear algorithm, resp.? To make it clear because obviously the first responders misunderstood the question: I am not looking for ...
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1answer
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NP and 3-SAT and One Facts

any expert could help me why this sentence is True? if L ∈ NP and L ≤p 3−SAT (i.e: reduce L to 3-SAT in poly time) then L is NP-Complete.
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How to design acceptance probability function for simulated annealing with multiple distinct costs?

I am using simulated annealing to solve an NP-complete resource scheduling problem. For each candidate ordering of the tasks I compute several different costs (or energy values). Some examples are ...
4
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4answers
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If a problem X (decision problem) is known to be NP-Complete, and proven to be reduced to problem Y, can you then say problem Y is NP-Complete?

If a problem X (decision problem) is known to be NP-Complete, and proven to be reduced to problem Y in polynomialtime, can you then say problem Y is NP-Complete? My first thought was, no, problem Y ...
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NP-Complete and some decision problems on graph?

We know about NP-Complete and NP-Hard, and NP Class. I want to conclude some tips on following problem, that take from 2008 Mid exam on MIT. Decision Version of which of the following problem for a ...
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Algorithm to maximize profit: ways to solve/approach? (Advanced NP-Complete)

This one's hard, so all help really appreciated! I know it is NP-Complete and thus cannot be solved in polynomial time, but looking for help in analysis, what type of NP-Complete problem it reduces ...
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Are virtually all major distributed computing projects attempting to solve problems in NP? [closed]

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 ...
4
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1answer
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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 ...
4
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2answers
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Counting Subgraph Instances

Let's say I have a large (several thousand node) directed graph G and a much smaller (3-5 node) directed graph g. I want to count how many isomorphisms of g are in G. In other words, I want to know ...
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Polynomial time algorithm for finding a Hamiltonian walk in a graph [closed]

Is there a polynomial time algorithm for finding a Hamiltonian walk in a graph? My algorithm is N factorial and is really slow.