| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 419428 | Discrete Applied Mathematics | 2012 | 8 Pages |
Abstract
In 1995, Gutman and Yeh (1995) [3] conjectured that for every large enough integer ww there exists a tree with Wiener index equal to ww. The conjecture has been solved by Wang and Yu (2006) [7] and independently by Wagner (2006) [6]. We present an algorithm with a constant number of operations to construct a tree with a given Wiener index. Moreover, we show that there exist 2Ω(w4) non-isomorphic trees with Wiener index ww.
Keywords
Related Topics
Physical Sciences and Engineering
Computer Science
Computational Theory and Mathematics
Authors
Jiří Fink, Borut Lužar, Riste Škrekovski,