| k华沙圈上连续自映射的某些动力性质 |
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| 引用本文: | 周丽珍,周友成.k华沙圈上连续自映射的某些动力性质[J].浙江大学学报(理学版),2002,29(1):12-16. |
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| 作者姓名: | 周丽珍 周友成 |
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| 作者单位: | 1. 苏州大学,数学系,江苏,苏州,215006
2. 浙江大学,数学系,浙江,杭州,310027 |
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| 基金项目: | 国家自然科学基金资助项目 (No.10 0 710 6 9) |
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| 摘 要: | 研究k华沙圈上连续自映射的某些动力性质,证明了k华沙圈不是Sarkovskii空间;具有PR性质;对定义在k华沙圈上的连续自映射而言,弧立链回归点是最终周期点;中心深度不超过4;如周期点的周期都是2的方幂,则拓扑熵为零;可迁映射等价于Devaney意义下的混沌。
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| 关 键 词: | k华沙圈 中心深度 拓扑熵 可迁映射 连续统理论 连续自映射 动力性质 |
| 文章编号: | 1008-9497(2002)01-0012-05 |
| 修稿时间: | 2000年4月10日 |
Some dynamical properties of continuous maps on the %k%-Warsaw circle. |
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| ZHOU Li-zhen,ZHOU You-cheng.Some dynamical properties of continuous maps on the %k%-Warsaw circle.[J].Journal of Zhejiang University(Sciences Edition),2002,29(1):12-16. |
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| Authors: | ZHOU Li-zhen ZHOU You-cheng |
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| Institution: | ZHOU Li-zhen+1,ZHOU You-cheng+2 |
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| Abstract: | Some dynamical properties of continuous maps on the \%k\%\|Warsaw circle are studied, show that: a \%k\%\|Warsaw circle need not be a Sarkovskii space; it has the \%PR\%\|property; for the self\|map on a \%k\%\|Warsaw circle, isolated chain recurrent points are eventually periodic; the depth of the center is not greater than 4; the topological entropy is zero provided that the periods of periodic points are the powers of 2; and transitive maps are equivalent to the chaos in the sense of Devaney. |
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| Keywords: | k\%\|Warsaw circle center depth of the center topological entropy transitive map |
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