Searching for just a few words should be enough to get started. If you need to make more complex queries, use the tips below to guide you.
Issue title: Computational Intelligence and Brain Understanding
Guest editors: Kuntal Ghosh and Sushmita Mitra
Article type: Research Article
Authors: Cheng, Baoleia | Fan, Jianxia; * | Lyu, Qianga | Lin, Cheng-Kuanb | Li, Xiaoyanb | Chen, Guoc
Affiliations: [a] School of Computer Science and Technology, Soochow University, Suzhou 215006, China. chengbaolei@suda.edu.cn, jxfan@suda.edu.cn, qiang@suda.edu.cn | [b] College of Mathematics and Computer Science, Fuzhou University, Fuzhou 350116, China. cklin@fzu.edu.cn, xyli@fzu.edu.cn | [c] School of Computer Science and Technology, Soochow University, Suzhou 215006, China. 20185227077@stu.suda.edu.cn
Correspondence: [*] Address for correspondence: School of Computer Science and Technology, Soochow University, Suzhou 215006, China.
Abstract: For a network, edge/node-independent spanning trees (ISTs) can not only tolerate faulty edges/nodes, but also be used to distribute secure messages. As important node-symmetric variants of the hypercubes, the augmented cubes have received much attention from researchers. The n-dimensional augmented cube AQn is both (2n ‒ 1)-edge-connected and (2n ‒ 1)-nodeconnected (n ≢ 3), thus the well-known edge conjecture and node conjecture of ISTs are both interesting questions in AQn. So far, the edge conjecture on augmented cubes was proved to be true. However, the node conjecture on AQn is still open. In this paper, we further study the construction principle of the node-ISTs by using the double neighbors of every node in the higher dimension. We prove the existence of 2k − 1 node-ISTs rooted at node 0 in AQn(00...0︸n−k)(n≥k≥4) by proposing an ingenious way of construction and propose a corresponding O(NlogN) time algorithm, where N = 2k is the number of nodes in AQn(00...0︸n−k) .
Keywords: Augmented cubes, node-independent spanning trees, constructive algorithm, secure message distribution
DOI: 10.3233/FI-2020-1965
Journal: Fundamenta Informaticae, vol. 176, no. 2, pp. 103-128, 2020
IOS Press, Inc.
6751 Tepper Drive
Clifton, VA 20124
USA
Tel: +1 703 830 6300
Fax: +1 703 830 2300
sales@iospress.com
For editorial issues, like the status of your submitted paper or proposals, write to editorial@iospress.nl
IOS Press
Nieuwe Hemweg 6B
1013 BG Amsterdam
The Netherlands
Tel: +31 20 688 3355
Fax: +31 20 687 0091
info@iospress.nl
For editorial issues, permissions, book requests, submissions and proceedings, contact the Amsterdam office info@iospress.nl
Inspirees International (China Office)
Ciyunsi Beili 207(CapitaLand), Bld 1, 7-901
100025, Beijing
China
Free service line: 400 661 8717
Fax: +86 10 8446 7947
china@iospress.cn
For editorial issues, like the status of your submitted paper or proposals, write to editorial@iospress.nl
如果您在出版方面需要帮助或有任何建, 件至: editorial@iospress.nl