摘要
对紧度量空间X上的连续自映射f:X→X,Hurley利用一点逆像的(n,ε)(?)分离子集,引入了熵hp(f)和hm(f)按照拓扑熵观点,它们也度量了系统(x,f)的复杂性.本文将以Nielsen根类理论为工具,首先给出hp(f)的一个恰当的下界估计;然后作为该结果的应用,我们具体计算了环面上一类自映射的熵hp(f),同时得到了该空间上自映射同伦类熵的一个下界估计.
Let X be a compact metric space and f : X→X a continuous map, the ontropy h_m(f) and h_p(f), which were defined by Hurley in terms of (n, ε)-separated subsets ot inverse images of individual points, ineasure cornplexity of the system(X, f) in topological entropy point of view. In this paper, we give firstly the estimation of lower bound of h_p(f) by using Nielsen root class theory. Secondly, as the applications of the result, we compute the entropies h_p(f) of typical selfmaps on tori, as well as obtaining a lower bound of the entropies of homotopy class for the solfmaps on these spaces.
出处
《数学进展》
CSCD
北大核心
2005年第3期338-342,共5页
Advances in Mathematics(China)
基金
The project is supported by the NSF of Anhui Province Education Department
