Difference between revisions of "CSE550 Combinatorial Algorithms/Intractability"

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*[http://books.google.com/books?id=EILqAmzKgYIC&pg=PA100&lpg=PA100&dq=max+flow+min+cut+duality+complementary+slackness&source=web&ots=XicYGOVV8-&sig=Xa-U-NVuTyUcThBYpM_jb60on_8#PPA101,M1 Max-Cut, Min-Flow and information on complementary slackness]
 
*[http://books.google.com/books?id=EILqAmzKgYIC&pg=PA100&lpg=PA100&dq=max+flow+min+cut+duality+complementary+slackness&source=web&ots=XicYGOVV8-&sig=Xa-U-NVuTyUcThBYpM_jb60on_8#PPA101,M1 Max-Cut, Min-Flow and information on complementary slackness]
 
*[http://www.econ.ucsd.edu/~jsobel/172aw02/notes6.pdf Duality and Complementary Slackness]
 
*[http://www.econ.ucsd.edu/~jsobel/172aw02/notes6.pdf Duality and Complementary Slackness]
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=== Q4 ===
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*[http://books.google.com/books?id=ymJTEjPg6CcC&pg=PT125&lpg=PT125&dq=edge+coloring+bipartite+multigraph+lp&source=web&ots=2J_0-ug5n6&sig=kOcj0lJmyQk5DmQty0pbnOVwQXQ ''Handbook of Scheduling: Algorithms, Models, and Performance Analysis''], By Joseph Y-T. Leung (bipartite multi-graph edge coloring)
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=== Q5 ===
 
=== Q5 ===

Revision as of 16:27, 1 December 2007

Resources

-Unimodularity ensures that the solution to an LP will always be integer if all of the costs and constraints are also integer


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

HW 7

1.
-Theorem 1.2 (Kumar and Li, 2002) Any asymmetric TSP on n locations can be reducedto a symmetric TSP on 2n locations

Midterm

Q1

Q4

Final

Q2

Q3

Q4


Q5

Project

2. Linear program formulation and solving. You can examine one or more linear programming formulations for a speci�c problem. This should be done by using a free solver, such as GLPK and a modeling language such as AMPL or the subset of AMPL that comes with GLPK. (If you have access to CPLEX and/or real AMPL, that is also perfectly fine with me.) Your goal in this might be to examine and compare the solution times for several formulations of a problem (as in the mincut example), or to study the tightness of a relaxation (as in the case of Steiner trees and edge coloring). Some suggestions for this type of project:

-Comparing minimum cut formulations (standard cut covering, polynomial-size directed flow formulation, compact formulation by Carr et al.).
-Bidirected formulation for the Steiner tree problem (Rajagopalan-Vazirani).
-Asymmetric TSP (Charikar, Goemans, Karloff).
-Matching-based LP relaxation of edge-coloring gap should be an additive 1! There is a paper by Jeff Kahn, but it is somewhat difficult.
-Chapter 7. LP in Practice
-> Chapter 10. Network Flow Programming