AMALGAMATION OF PERIODIC AND CHAOTIC SOLUTIONS IN A DOUBLE PARALLELCONNECTED LORENZ SYSTEM
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Abstract
With increasing Rayleigh number in a double parallel-connected Lorenz system, it is found numerically that the coexisting periodic and chaotic solutions approach each other gradually and collide at last. In fact, the periodic solution is swallowed by the chaotic one without undergoing any bifurcation.
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Cite this article:
ZOU Chengzhi. AMALGAMATION OF PERIODIC AND CHAOTIC SOLUTIONS IN A DOUBLE PARALLELCONNECTED LORENZ SYSTEM[J]. Chin. Phys. Lett., 1986, 3(4): 161-164.
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ZOU Chengzhi. AMALGAMATION OF PERIODIC AND CHAOTIC SOLUTIONS IN A DOUBLE PARALLELCONNECTED LORENZ SYSTEM[J]. Chin. Phys. Lett., 1986, 3(4): 161-164.
|
ZOU Chengzhi. AMALGAMATION OF PERIODIC AND CHAOTIC SOLUTIONS IN A DOUBLE PARALLELCONNECTED LORENZ SYSTEM[J]. Chin. Phys. Lett., 1986, 3(4): 161-164.
|
ZOU Chengzhi. AMALGAMATION OF PERIODIC AND CHAOTIC SOLUTIONS IN A DOUBLE PARALLELCONNECTED LORENZ SYSTEM[J]. Chin. Phys. Lett., 1986, 3(4): 161-164.
|
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