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Modeling and analysis of bifurcation in a delayed worm propagation model
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نویسنده
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yao y. ,zhang n. ,xiang w. ,yu g. ,gao f.
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منبع
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journal of applied mathematics - 2013 - دوره : 2013 - شماره : 0
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چکیده
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A delayed worm propagation model with birth and death rates is formulated. the stability of the positive equilibrium is studied. through theoretical analysis,a critical value τ0 of hopf bifurcation is derived. the worm propagation system is locally asymptotically stable when time delay is less than τ0. however,hopf bifurcation appears when time delay τ passes the threshold τ0,which means that the worm propagation system is unstable and out of control. consequently,time delay should be adjusted to be less than τ0 to ensure the stability of the system stable and better prediction of the scale and speed of internet worm spreading. finally,numerical and simulation experiments are presented to simulate the system,which fully support our analysis. © 2013 yu yao et al.
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آدرس
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college of information science and engineering,northeastern university,shenyang 110819,china,key laboratory of medical image computing,northeastern university,ministry of education, China, college of information science and engineering,northeastern university, China, college of information science and engineering,northeastern university, China, college of information science and engineering,northeastern university,shenyang 110819,china,key laboratory of medical image computing,northeastern university,ministry of education, China, college of information science and engineering,northeastern university, China
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Authors
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