Difference between revisions of "CSE550 Combinatorial Algorithms/Intractability"
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:*[http://209.85.173.104/search?q=cache:qgZ0E6cTD20J:www.cs.uu.nl/docs/vakken/amc/lecture03-2.ps+%22asymmetric+metric+TSP%22&hl=en&ct=clnk&cd=1&gl=us Additional infor (a),(b), possible references for (c)] | :*[http://209.85.173.104/search?q=cache:qgZ0E6cTD20J:www.cs.uu.nl/docs/vakken/amc/lecture03-2.ps+%22asymmetric+metric+TSP%22&hl=en&ct=clnk&cd=1&gl=us Additional infor (a),(b), possible references for (c)] | ||
::-Theorem 1.2 (Kumar and Li, 2002) Any asymmetric TSP on n locations can be reducedto a symmetric TSP on 2n locations | ::-Theorem 1.2 (Kumar and Li, 2002) Any asymmetric TSP on n locations can be reducedto a symmetric TSP on 2n locations | ||
| − | + | :*[http://www.sciencedirect.com.ezproxy1.lib.asu.edu/science?_ob=ArticleListURL&_method=list&_ArticleListID=654442605&_sort=d&view=c&_acct=C000059542&_version=1&_urlVersion=0&_userid=56861&md5=7c0e2798e0ed6ae5bd0b5865eea21691 Science Direct "Problems"] | |
== Midterm == | == Midterm == | ||
=== Q1 === | === Q1 === | ||
Revision as of 22:12, 26 November 2007
Resources
- -Unimodularity ensures that the solution to an LP will always be integer if all of the costs and constraints are also integer
- Linear Programming animation (simplex method)
- List of LP solvers (including NEOS)
- Integer Linear Programming Tutorial
- Interger Linear Programming Tutorial (CMU)
- Opensource Algorithm Code, Zuse Institute
- Lectures from the University of Freiburg
HW 6
- 1. 2-SAT is in NP
- 2. A sub-optimal solution to TSP is a Hamiltonian Cycle.
- 3. 3SAT reduction to NAESAT
- 4. Finding disjoint paths with different path-costs: Complexity and algorithms
- Randeep Bhatia · Murali Kodialam · T. V. Lakshman, "Finding disjoint paths with related path costs", Springer Science+Business Media, LLC 2006
HW 7
- 1.
- Optimization Theory By Hubertus Th. Jongen, Klaus Meer, Eberhard Triesch, partial search result on Google book search
- Solution to part (a),(b)
- Solution to part (a),(b)
- Additional infor (a),(b), possible references for (c)
- -Theorem 1.2 (Kumar and Li, 2002) Any asymmetric TSP on n locations can be reducedto a symmetric TSP on 2n locations
Midterm
Q1
- Bin Zhang, Julie Ward, Qi Feng, "Simultaneous Parametric Maximum Flow Algorithm with Vertex Balancing", HP Laboratories Palo Alto, June 28, 2005
- J. M. W. Rhys, "A Selection Problem of Shared Fixed Costs and Network Flows", Management Science, Vol. 17, No. 3, Theory Series (Nov., 1970), pp. 200-207
Q4
Project
- GNU Linear Programming Kit guide from IBM
- GLPsol Tutorial
- Practical Optimization: A Gentle Introduction
- Robert Fourer, AMPL: "A Mathematical Programming Language"
