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标题：Bifurcation of Limit Cycles of a Class of Piecewise Linear Differential Systems in <svg style="vertical-align:-0.27pt;width:25.5px;" id="M1" height="22.012501" version="1.1" viewBox="0 0 25.5 22.012501" width="25.5" xmlns:xlink="http://www.w3.org/1999/xlink" xmlns="http://www.w3.org/2000/svg"> <g transform="matrix(.022,-0,0,-.022,.062,21.612)"><path id="x211C" d="M378 16l-47 -24q-16 -7 -31 -7t-27 6l-130 58q-16 7 -21 14t-5 22v316q0 63 -8 77t-45 19v14l125 64l4 -2v-472l185 -82v-3zM701 30l-75 -38q-16 -7 -31 -7q-36 0 -54 28l-155 232q-23 33 -23 50q0 15 24 27q118 61 118 140q0 35 -22.5 65t-57.5 46l-90 40l-53 -27v-419
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作者：Yanyan Cheng
期刊名称：Discrete Dynamics in Nature and Society
印刷版ISSN：1026-0226
电子版ISSN：1607-887X
出版年度：2013
卷号：2013
DOI：10.1155/2013/385419
出版社：Hindawi Publishing Corporation
摘要：We study the bifurcation of limit cycles from periodic orbits of a four-dimensional system when the perturbation is piecewise linear with two switching boundaries. Our main result shows that when the parameter is sufficiently small at most, six limit cycles can bifurcate from periodic orbits in a class of asymmetric piecewise linear perturbed systems, and, at most, three limit cycles can bifurcate from periodic orbits in another class of asymmetric piecewise linear perturbed systems. Moreover, there are perturbed systems having six limit cycles. The main technique is the averaging method.