標題: Topological entropy for multidimensional perturbations of snap-back repellers and one-dimensional maps
作者: Li, Ming-Chia
Lyu, Ming-Jiea
Zgliczynski, Piotr
應用數學系
Department of Applied Mathematics
公開日期: 1-Nov-2008
摘要: We consider a one-parameter family of maps F(lambda) on R(m) x R(n) with the singular map F(0) having one of the two forms (i) F(0) (x, y) = (f (x), g(x)), where f : R(m) -> R(m) and g : R(m) -> R(n) are continuous, and (ii) F(0)( x, y) = (f (x), g(x, y)), where f : R(m) -> R(m) and g : R(m) x R(n) -> Rn are continuous and g is locally trapping along the second variable y. We show that if f is one-dimensional and has a positive topological entropy, or if f is high-dimensional and has a snap-back repeller, then F. has a positive topological entropy for all lambda close enough to 0.
URI: http://dx.doi.org/10.1088/0951-7715/21/11/005
http://hdl.handle.net/11536/8202
ISSN: 0951-7715
DOI: 10.1088/0951-7715/21/11/005
期刊: NONLINEARITY
Volume: 21
Issue: 11
起始頁: 2555
結束頁: 2567
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