In their great 1960 work On the Evolution of Random Graphs, Paul Erd os and Alfred Rényi expressed a special interest in the behavior of Γ n,N (n) , the random graph with n vertices and N (n) edges, when N (n) was near n 2 : Thus the situation may be summarized as follows:...
on the evolution of random graphs ON THE EVOLUTION OF RANDOM GRAPHS by P. ERD6S and A. R~NYI Dedicated to his 60th birthday. Profe88m- P. Turdn at lotroduction Our aim is to study the probable structure of a ra.ridom gra.ph r,.N which ha.s n given labelled vertices P 1, P2 ...
On the evolution of random graphs in the n-cube [For the entire collection see Zbl 0588.00010.] Random induced resp. spanning subgraphs of the n-cube graph $Q\\sb n$ are obtained from $Q\\sb n$ by independent deletion the vertices (together with all edges incident with them) or the ...
On the evolution of random graphs. Publ. Math. Inst. Hungarian Acad. Sci. 5, 17–61 (1960) MathSciNet MATH Google Scholar Barabasi, A. & Albert, R. Emergence of scaling in random networks. Science 286, 509–512 (1999) Article ADS MathSciNet CAS Google Scholar Nagylaki, T. & ...
Rényi: On the evolution of random graphs, Magyar Tud. Akad. Mat. Kut. Int. Közl., 5 (1960) 17–65. (Reprinted in [92] and in [60].) Google Scholar P. Erdős, A. Rényi and V. T. Sós: On a problem of graph theory, Stud Sci. Math. Hung., 1 (1966) 215–235. ...
On the evolution of random graphs. Publications of the Mathematical Institute of the Hungarian Academy of Sciences 17–61, (1960). Chen, C.-T. Linear System Theory and Design, 2nd edn (Oxford University Press, Inc., New York, 1995). Liu, Y.-Y., Slotine, J.-J. & Barabasi, A.-L...
This is a preview of subscription content, log in via an institution to check access. Similar content being viewed by others A Random Walk on the Rado Graph Chapter © 2022 Distributions and Characterizations Associated with a Random Walk Article 30 June 2023 Models of Random Graphs and...
We shall also calculate the probability that the evolution will be trapped eventually using the martingale method.数学学报(英文版)doi:10.1007/s10114-010-6286-9XinXingCHENJianGangYINGX.X. Chen and J.G. Ying. Random coloring evolution on graphs. Acta Math. Sin., 26(2):369- 376, 2010....
et al. On the evolution of random graphs. Publ. Math. Inst. Hung. Acad. Sci 5, 17–60 (1960). MathSciNet MATH Google Scholar Boccaletti, S., Latora, V., Moreno, Y., Chavez, M. & Hwang, D.-U. Complex networks: Structure and dynamics. Phys. Rep. 424, 175–308. https://...
《Random Walks on Infinite Graphs and Groups》作者:Cambridge University Press,出版社:2008年5月,ISBN:。Themainthemeofthisbookistheinterplaybetweenrandomw