Journal ArticleDOI
The shortest path through many points
Jillian Beardwood,John H. Halton,J. M. Hammersley +2 more
- Vol. 55, Iss: 4, pp 299-327
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TLDR
In this paper, it was shown that the length of the shortest closed path through n points in a bounded plane region of area v is almost always asymptotically proportional to √(nv) for large n; and this result was extended to bounded Lebesgue sets in k-dimensional Euclidean space.Abstract:
We prove that the length of the shortest closed path through n points in a bounded plane region of area v is ‘almost always’ asymptotically proportional to √(nv) for large n; and we extend this result to bounded Lebesgue sets in k–dimensional Euclidean space. The constants of proportionality depend only upon the dimensionality of the space, and are independent of the shape of the region. We give numerical bounds for these constants for various values of k; and we estimate the constant in the particular case k = 2. The results are relevant to the travelling-salesman problem, Steiner's street network problem, and the Loberman—Weinberger wiring problem. They have possible generalizations in the direction of Plateau's problem and Douglas' problem.read more
Citations
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Journal ArticleDOI
The balancing traveling salesman problem: application to warehouse order picking
TL;DR: The findings, which are guided by extensive simulation runs, provide statistical estimations for the tour length under different scenarios, and the utility of statistical estimates for TSP tour length for order picking is demonstrated on a common warehouse layout.
Journal ArticleDOI
Separating subadditive euclidean functionals
Alan Frieze,Wesley Pegden +1 more
TL;DR: In this article, it was shown that the TSP on random points in Euclidean space is indeed asymptotically distinct from these and other natural lower bounds, and that this separation implies that branch-and-bound algorithms based on these natural lower-branch algorithms must take nearly exponential time to solve TSP to optimality.
Journal ArticleDOI
Probability and statisitics in the service of computer science: illustrations using the assignment problem
TL;DR: The assignment problem is examined in connection with the analysis of greedy algorithms, marriage lemmas, linear programming with random costs, randomization based matching, stochastic programming, and statistical mechanics.
Proceedings ArticleDOI
Optimal solution for travelling salesman problem using heuristic shortest path algorithm with imprecise arc length
Sumarni Abu Bakar,Milbah Ibrahim +1 more
TL;DR: A modified algorithm which utilized heuristic shortest path method and fuzzy approach is proposed for solving a network with imprecise arc length, using interval number and triangular fuzzy number in representing arc length of the network.
Journal ArticleDOI
An appraisal of computational complexity for operations researchers
TL;DR: Recent developments in the theory and practice of computational complexity are reviewed, in order to highlight some of the basic concepts and ideas that have come out of this area.
References
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Journal ArticleDOI
On the shortest spanning subtree of a graph and the traveling salesman problem
TL;DR: Kurosh and Levitzki as discussed by the authors, on the radical of a general ring and three problems concerning nil rings, Bull Amer Math Soc vol 49 (1943) pp 913-919 10 -, On the structure of algebraic algebras and related rings.
Book ChapterDOI
Solution of a Large-Scale Traveling-Salesman Problem
TL;DR: The RAND Corporation in the early 1950s contained Arrow, Bellman, Dantzig, Flood, Ford, Fulkerson, Gale, Johnson, Nash, Orchard-Hays, Robinson, Shapley, Simon, Wagner, and other household names as discussed by the authors.
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