English

R-connectivity Augmentation in Trees

Discrete Mathematics 2016-08-08 v1 Combinatorics

Abstract

A \emph{vertex separator} of a connected graph GG is a set of vertices removing which will result in two or more connected components and a \emph{minimum vertex separator} is a set which contains the minimum number of such vertices, i.e., the cardinality of this set is least among all possible vertex separator sets. The cardinality of the minimum vertex separator refers to the connectivity of the graph G. A connected graph is said to be kconnectedk-connected if removing exactly kk vertices, k1 k\geq 1, from the graph, will result in two or more connected components and on removing any (k1)(k-1) vertices, the graph is still connected. A \emph{connectivity augmentation} set is a set of edges which when augmented to a kk-connected graph GG will increase the connectivity of GG by rr, r1r \geq 1, making the graph (k+r)(k+r)-connectedconnected and a \emph{minimum connectivity augmentation} set is such a set which contains a minimum number of edges required to increase the connectivity by rr. In this paper, we shall investigate a rr-connectivityconnectivity augmentation in trees, r2r \geq 2. As part of lower bound study, we show that any minimum rr-connectivity augmentation set in trees requires at least 12i=1r1(ri)×li \lceil\frac{1}{2} \sum\limits_{i=1}^{r-1} (r-i) \times l_{i} \rceil edges, where lil_i is the number of vertices with degree ii. Further, we shall present an algorithm that will augment a minimum number of edges to make a tree (k+r)(k+r)-connected.

Cite

@article{arxiv.1608.01971,
  title  = {R-connectivity Augmentation in Trees},
  author = {S. Dhanalakshmi and N. Sadagopan and Nitin Vivek Bharti},
  journal= {arXiv preprint arXiv:1608.01971},
  year   = {2016}
}

Comments

5 figures, 3 algorithms, presented in RMS 31st Annual Conference

R2 v1 2026-06-22T15:13:33.890Z