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ESA
2010
Springer
2010
Springer
Balancing Degree, Diameter and Weight in Euclidean Spanners
Abstract. In a seminal STOC'95 paper, Arya et al. [4] devised a construction that for any set S of n points in Rd and any > 0, provides a (1 + )-spanner with diameter O(log n), weight O(log2 n)w(MST(S)), and constant maximum degree. Another construction of [4] provides a (1 + )-spanner with O(n) edges and diameter (n), where stands for the inverse-Ackermann function. Das and Narasimhan [18] devised a construction with constant maximum degree and weight O(w(MST(S))), but whose diameter may be arbitrarily large. In another construction by Arya et al. [4] there is diameter O(log n) and weight O(log n)w(MST(S)), but it may have arbitrarily large maximum degree. These constructions fail to address situations in which we are prepared to compromise on one of the parameters, but cannot afford it to be arbitrarily large. In this paper we devise a novel unified construction that trades between maximum degree, diameter and weight gracefully. For a positive integer k, our construction pr...
Real-time Traffic| Added | 09 Nov 2010 |
| Updated | 09 Nov 2010 |
| Type | Conference |
| Year | 2010 |
| Where | ESA |
| Authors | Shay Solomon, Michael Elkin |
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