Bifurcations of heteroclinic loops with nonresonant eigenvalues


Authors

Zheng Guo - School of Science, Linyi University, Linyi, Shandong, 276005, China. Yinlai Jin - School of Science, Linyi University, Linyi, Shandong, 276005, China. Yuerang Gao - Lanling County First Middle School, Lanling, Shangdong, 277700, China. Dandan Xie - School of Mathematical Sciences, Shandong Normal University, Jinan, 250014, China.


Abstract

In this paper, we use the way of local coordinates instead of the Floquet method to study the problems of homoclinic and periodic orbits bifurcated from heteroclinic loop for high-dimensional system. Under some transversal conditions and the non-twisted or twisted conditions, we discuss the existence, uniqueness, coexistence, and non-coexistence of 1-periodic orbit, 1-homoclinic orbit, and 1-heteroclinic orbit near the heteroclinic loop. We get some general conclusions only under the basic hypotheses, and the other conclusions under the two hyperbolic ratios of the heteroclinic loop are greater than 1. Meanwhile, the bifurcation surfaces and existence regions are given.


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ISRP Style

Zheng Guo, Yinlai Jin, Yuerang Gao, Dandan Xie, Bifurcations of heteroclinic loops with nonresonant eigenvalues, Journal of Mathematics and Computer Science, 17 (2017), no. 1, 115-132

AMA Style

Guo Zheng, Jin Yinlai, Gao Yuerang, Xie Dandan, Bifurcations of heteroclinic loops with nonresonant eigenvalues. J Math Comput SCI-JM. (2017); 17(1):115-132

Chicago/Turabian Style

Guo, Zheng, Jin, Yinlai, Gao, Yuerang, Xie, Dandan. "Bifurcations of heteroclinic loops with nonresonant eigenvalues." Journal of Mathematics and Computer Science, 17, no. 1 (2017): 115-132


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