Topological entropy of piecewise embedding maps on regular curves
スポンサーリンク
概要
- 論文の詳細を見る
It is well known that in the dynamics of a piecewise strictly monotone (that is,piecewise embedding) map f on an interval, the topological entropy can be expressed interms of the growth of the number (that is, the lap number) of strictly monotone intervalsfor f n. Recently, there has been an increase in the importance of fractal sets in the sciences,and many geometric and dynamical properties of fractal sets have been studied. In thepresent paper, we shall study topological entropy of some maps on regular curves, whichare contained in the class of fractal sets. We generalize the theorem ofMisiurewicz–Szlenkand Young to the cases of regular curves and dendrites.
- Cambridge University Pressの論文
- 2006-08-00
Cambridge University Press | 論文
- Sequence analysis of porcine polymeric immunoglobulin receptor from mammary epithelial cells present in colostrum
- 土木工学のコアとは何か
- Fruit, vegetable and bean intake and mortality from cardiovascular disease among Japanese men and women : the JACC Study
- Intracellular production of adrenal renin in the fetal mouse. An immuno-electron microscopic study
- Retinol binding protein 4 in dairy cows : its presence in colostrum and alteration in plasma during fasting, inflammation, and the peripartum period