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Simpler analysis of LP extreme points for traveling salesman and survivable network design problems |
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| Authors: | Viswanath Nagarajan R. Ravi |
| Affiliation: | a IBM T.J. Watson Research Center, Yorktown Heights, NY 10598, USA b Tepper School of Business, CMU, Pittsburgh, PA, USA c McGill University, Montreal, QC, Canada |
| Abstract: | We consider the Survivable Network Design Problem (SNDP) and the Symmetric Traveling Salesman Problem (STSP). We give simpler proofs of the existence of a  -edge and 1-edge in any extreme point of the natural LP relaxations for the SNDP and STSP, respectively. We formulate a common generalization of both problems and show our results by a new counting argument. We also obtain a simpler proof of the existence of a  -edge in any extreme point of the set-pair LP relaxation for the element connectivitySurvivable Network Design Problem ( ). |
| Keywords: | Linear programming relaxations Traveling salesman Survivable network design Approximation algorithms |
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