Your search keyword '"inapproximability results"' showing total 2 results

1. Inapproximability results for graph convexity parameters.

Author

Coelho, Erika M.M., Dourado, Mitre C., and Sampaio, Rudini M.

Subjects

*GRAPH theory, *MATHEMATICAL proofs, *CONVEX domains, *GEODESICS, *NUMBER theory

Abstract

In this paper, we prove several inapproximability results on the P 3 -convexity and the geodesic convexity in graphs. We prove that determining the P 3 -hull number and the geodetic hull number are APX-hard problems. We prove that the Carathéodory number, the Radon number and the convexity number of both convexities are O ( n 1 − ε ) -inapproximable in polynomial time for every ε > 0 , unless P = NP . We also prove that the interval numbers of both convexities are W [ 2 ] -hard and O ( log ⁡ n ) -inapproximable in polynomial time, unless P = NP . Moreover, these results hold for bipartite graphs in the P 3 -convexity. [ABSTRACT FROM AUTHOR]

Published

2015

2. Approximation hardness of Travelling Salesman via weighted amplifiers

Author

Chlebik, Miroslav, Chlebikova, Janka, Du, Ding-Zhu, Duan, Zhenhua, and Tian, Cong

Subjects

Computational Theory and Mathematics, weighted amplifiers, Travelling Salesman Problem, Computing, Discrete Mathematics and Combinatorics, inapproximability results, Mathematics, Theoretical Computer Science

Abstract

The expander graph constructions and their variants are the main tool used in gap preserving reductions to prove approximation lower bounds of combinatorial optimisation problems. In this paper we introduce the weighted amplifiers and weighted low occurrence of Constraint Satisfaction problems as intermediate steps in the NP-hard gap reductions. Allowing the weights in intermediate problems is rather natural for the edge-weighted problems as Travelling Salesman or Steiner Tree. We demonstrate the technique for Travelling Salesman and use the parametrised weighted amplifiers in the gap reductions to allow more flexibility in fine-tuning their expanding parameters. The purpose of this paper is to point out effectiveness of these ideas, rather than to optimise the expander’s parameters. Nevertheless, we show that already slight improvement of known expander values modestly improve the current best approximation hardness value for TSP from 123/122 ([9]) to 117/116 . This provides a new motivation for study of expanding properties of random graphs in order to improve approximation lower bounds of TSP and other edge-weighted optimisation problems.

Published

2019