<原報>カオスとフラクタルの「自己相似性」 小田原 宏行 共立薬科大学 共立薬科大学研究年報 04529731 38 0 29 40 1993-03-25 This article shows that the Self-Similarity in fractals is closely related to the structure of the chaos. The Euler sheme of dynamical system is considered, and its chaos features are presented by changing increment of t. Baker's map is used to show how Self-Similarity and Mixing are caused and figures under this map are compared with those of Poincare map. In the calculations of the Euler sheme, heteroclinic and homoclinic orbits are calculated and shown. 1993-03-25 110000059017 AN00062898 JPN NII-ELS 3 Chaos and Self-Similarity of Fractals ODAWARA Hiroyuki Kyoritsu College of Pharmacy The annual report of the Kyoritsu College of Pharmacy This article shows that the Self-Similarity in fractals is closely related to the structure of the chaos. The Euler sheme of dynamical system is considered, and its chaos features are presented by changing increment of t. Baker's map is used to show how Self-Similarity and Mixing are caused and figures under this map are compared with those of Poincare map. In the calculations of the Euler sheme, heteroclinic and homoclinic orbits are calculated and shown. 小田原 宏行 ODAWARA Hiroyuki