1
vote
2answers
74 views

NP-Complete with polynomial reducibility [closed]

A, B, C are all decision problems, and (1) A is polynomial time reducible to B, (2) B is polynomial time reducible to C. If both A and C are NP-Complete, then B is also NP-Complete? I know that if A ...
0
votes
1answer
74 views

How can some NP-Complete problems be also NP-Hard?

I'm trying wrap my heard around P, NP, NP-Complete and NP-Hard in an intuitive way so that I don't have to remember their definitions. In the following image (the left hand scenario, P != NP), ...
3
votes
1answer
52 views

Complexity measurement of NP-complete

For example, the set-cover decision problem is known to be a NP-complete problem. The input of this problems is a universe U, a family S of subsets of U, and an integer k (). One thing that I'm ...
4
votes
0answers
82 views

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 ...
1
vote
1answer
348 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 ...
1
vote
2answers
189 views

Does the complexity of strongly NP-hard or -complete problems change when their input is unary encoded? [closed]

Does the difficulty of a strongly NP-hard or NP-complete problem (as e.g. defined here http://en.wikipedia.org/wiki/Strongly_NP-complete) change when its input is unary instead of binary encoded? ...
0
votes
1answer
89 views

Showing that the decison version of an NP-complete language is NP-complete

Say you are given a combinatorial optimization problem A. Let us assume WLOG that the problem is the clique problem. How can I show that if clique is NP-complete, then the decision version of clique ...
0
votes
1answer
131 views

reducing to np hard

Wiki says that when you convert a np complte problem in poly time to A , A is np hard. see http://en.wikipedia.org/wiki/NP-hard But the pdf below says that when you convert a np hard problem to ...
4
votes
3answers
1k views

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 ...
1
vote
3answers
266 views

Is a reduction enough for proving NP-complete or do I need a transformation?

If I have a decision problem A, and wish to show that it is NP-complete. Is it enough to prove that another NP-complete problem polynomially reduces to A, or must I show that another NP-complete ...
1
vote
2answers
589 views

Are all NP problems also NP-complete?

The definition of NP-complete is A problem is NP-complete if it belongs to class NP all the other problems in NP polynomially transform to it So, if all other problems in NP transform to an ...
2
votes
3answers
211 views

A very complex problem in reduction notion

I have studied many about reduction but I have a bad problem in it: I take this from CLRS : " ... by “reducing” solving problem A to solving problem B, we use the “easiness” of B to prove the ...
0
votes
1answer
450 views

String to string correction problem np-completeness proof

I have this assignment to prove that this problem: Finite alphabet £, two strings x,y € £*, and a positive integer K. Is there a way to derive the string y from the string x by a sequence ...
1
vote
1answer
417 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 ...
2
votes
1answer
275 views

Where does optical character recognition (OCR) fall on the scale of problem difficulty?

How hard is Optical Character Recognition (OCR), formally? Let's assume an error tolerance comparable to a human (which is, I believe, around 98%). In other words, where would it fit in the P/NP ...
3
votes
3answers
611 views

Can NP-Intermediate exist if P = NP?

My understanding is that Ladner's theorem is basically this: P != NP implies that there exists a set NPI where NPI is not in P and NPI is not NP-complete What happens to this theorem if we ...
0
votes
2answers
1k views

Question about NP-Completeness of the Independent Set Problem

I thought that, when proving that a problem P is NP-Complete, we were supposed to reduce a known NPC problem to P. But, looking at the solution to the Independent Set problem, it seems to not go this ...
6
votes
3answers
587 views

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 ...
5
votes
1answer
900 views

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 ...
2
votes
5answers
2k views

NP-Complete reduction (in theory)

I want to embed 3 NP-Complete problems(2 of them are known to be NP-Complete, 1 of them is my own idea). I saw "this question" and got idea about reinterpreting embedding problems in theory: The ...
13
votes
5answers
1k views

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 ...
109
votes
7answers
15k views

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 ...