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"Geometri hiperbolik H^n, n>=2, merupakan salah satu contoh geometri non-Euclid. Pada artikelnya, Jeffers (2000) memberikan teorema mengenai bijeksi yang mempertahankan geodesik. Teorema tersebut menyatakan bahwa bijeksi yang mempertahankan geodesik di H^n adalah isometri. Pada kajian ini diberikan rincian bukti teorema di bidang hiperbolik H^2 dengan menggunakan model upper half plane.

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Hyperbolic geometry H^n, n>=2, is one of the example of non-Euclid Geometry. In his article, Jeffers (2000) present a theorem regarding bijection that preserves geodesic. The theorem states that bijection which preserves geodesic in H^n is an isometry. In this paper the proof of theorem in hyperbolic plane H^2 will be given with detail using upper half plane model.

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"This book presents recent progress on uniformly hyperbolic attractors in dynamical systems from a physical rather than mathematical perspective (e.g. the Plykin attractor, the Smale – Williams solenoid). The structurally stable attractors manifest strong stochastic properties, but are insensitive to variation of functions and parameters in the dynamical systems. Based on these characteristics of hyperbolic chaos, this monograph shows how to find hyperbolic chaotic attractors in physical systems and how to design a physical systems that possess hyperbolic chaos. "