主な著書・論文 |
学術論文 (* 査読有り)
- * Bratteli–Vershik models and graph covering models, Advances in Mathematics, Vol. 367 (2020), Article 107127, 本研究はJSPS科研費 JP16K05185 の助成を受けたものです.
- * A simple approach to minimal substitution subshifts, Topology and its Applications, Vol. 260 (2019), pp. 203-214, 本研究はJSPS科研費 JP16K05185 の助成を受けたものです.
- * Rank 2 proximal Cantor systems are residually scrambled, Dynamical Systems, Vol. 33 (2018), pp. 275-302, 本研究はJSPS科研費 JP16K05185 の助成を受けたものです.
- * Finite-rank Bratteli-Vershik homeomorphisms are expansive, Proc. Amer. Math. Soc. Vol. 145 (2017), pp. 4353-4362 , 本研究はJSPS科研費 JP16K05185 の助成を受けたものです.
- * Topological rank does not increase by natural extension of Cantor minimals, Kyushu J. Math. Vol. 71 (2017), pp. 299-309, 本研究はJSPS科研費 JP16K05185 の助成を受けたものです.
- * Zero-dimensional almost 1-1 extensions of odometers from graph coverings, Topology and its Applications, Vol. 209, (2016), pp. 63-90
- * The construction of a completely scrambled system by graph covers, Proc. Amer. Math. Soc. 144 (2016), pp. 2109-2120.
- * Graph covers and ergodicity for zero-dimensional systems, Ergodic Theory and Dynamical Systems, Vol. 36, (2016), pp. 608-631.
- * Non-homeomorphic topological rank and expansiveness, Kyushu J. Math., Vol. 69, (2015), pp. 413-428.
- * Special homeomorphisms and approximation for Cantor systems, Topology and its Applications., Vol. 161, (2014), pp. 178-195.
- * Aperiodic homeomorphisms approximate chain mixing endomorphisms on the Cantor set, Tsukuba J. Math., Vol. 36, (2013), pp. 173-183
- * A topological dynamical system on the Cantor set approximates its factors and its natural extension, Topology and its Applications, Vol.159, (2012), pp. 3137-3142.
- * Chain mixing endomorphisms are approximated by subshifts on the Cantor set,Tsukuba J. Math., Vol.35 (2011), pp. 67-77.
- * On a structure of a discrete dynamical systems from the view point of chain components and some applications, Japan. J. of Math. New Ser., Vol. 15, (1989), pp. 99-126.
- * The pseudo-orbit tracing property and expansiveness on the Cantor set, Proc. Amer. Math. Soc., Vol. 106, (1989), pp. 241-244.
- * Topological entropy and periodic points of a factor of a subshift of finite type, Nagoya Math J., Vol. 104, (1986), pp. 117-127.
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