Read More
Date: 1-4-2022
1521
Date: 7-4-2022
2392
Date: 27-7-2016
1490
|
Let be a graph, and suppose each edge of is independently deleted with fixed probability . Then the probability that no connected component of is disconnected as a result, denoted is known as the reliability polynomial of .
The reliability polynomial is directly expressible in terms of the Tutte polynomial of a given graph as
(1) |
where is the vertex count, the edge count, and the number of connected components (Godsil and Royle 2001, p. 358; error corrected). This is equivalent to the definition
(2) |
where is the number of subgraphs of the original graph having exactly edges and for which every pair of nodes in is joined by a path of edges lying in subgraph (i.e., is connected and ), which is the definition due to Page and Perry (1994) after making the change .
For example, the reliability polynomial of the Petersen graph is given by
(3) |
(Godsil and Royle 2001, p. 355).
The following table summarizes simple classes of graphs having closed-form reliability polynomials. Here, .
graph | |
banana tree | |
cycle graph | |
gear graph | |
ladder graph | |
pan graph | |
path graph | |
star graph | |
sunlet graph |
The following table summarizes the recurrence relations for reliability polynomials for some simple classes of graphs.
graph | order | recurrence |
cycle graph | 2 | |
gear graph | 3 | |
ladder graph | 2 | |
pan graph | 2 | |
path graph | 1 | |
star graph | 1 | |
sunlet graph | 2 | |
wheel graph | 3 |
Nonisomorphic graphs do not necessarily have distinct reliability polynomials. The following table summarizes some co-reliability graphs.
reliability polynomial | graphs | |
4 | claw graph, path graph | |
5 | fork graph, path graph , star graph | |
5 | bull graph, cricket graph, -tadpole graph | |
5 | dart graph, kite graph |
Brown, J. I. and Colbourn, C. J. "Roots of the Reliability Polynomial." SIAM J. Disc. Math. 5, 571-585, 1992.
Chari, M. and Colbourn, C. "Reliability Polynomials: A Survey." J. Combin. Inform. System Sci. 22, 177-193, 1997.
Colbourn, C. J. The Combinatorics of Network Reliability. New York: Oxford University Press, 1987.
Ellis-Monaghan, J. A. and Merino, C. "Graph Polynomials and Their Applications I: The Tutte Polynomial." 28 Jun 2008. http://arxiv.org/abs/0803.3079.
Godsil, C. and Royle, G. Algebraic Graph Theory. New York: Springer-Verlag, pp. 354-358, 2001.
Page, L. B. and Perry, J. E. "Reliability Polynomials and Link Importance in Networks." IEE Trans. Reliability 43, 51-58, 1994.
Royle, G.; Alan, A. D.; and Sokal, D. "The Brown-Colbourn Conjecture on Zeros of Reliability Polynomials Is False." J. Combin. Th., Ser. B 91, 345-360, 2004.
|
|
"عادة ليلية" قد تكون المفتاح للوقاية من الخرف
|
|
|
|
|
ممتص الصدمات: طريقة عمله وأهميته وأبرز علامات تلفه
|
|
|
|
|
المجمع العلمي للقرآن الكريم يقيم جلسة حوارية لطلبة جامعة الكوفة
|
|
|