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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagram of the electronic circuit for generalized synchronization. Here Lorenz is the driver and modified Lorenz is driven.
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagrams. (a) Lorenz system (driver). (b) Modified Lorenz system (driven).
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagrams. (a) Coupling between two circuits. (b) Noise generator circuit.
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagrams. (a) Variation of RMS value of error with coupling c' for different value of noise intensity D. As evident from the figure, as noise increases, synchronization arises for a lot less of a value of c'. (b) Lorenz system (driver) in xz plane. (c) Modified Lorenz system (driven) in xz plane. (d) At synchronized state, phase space between x variable of Lorenz system and modified Lorenz system.
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Variation of synchronization threshold for different values of coupling strength (c') and noise intensity (D)
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagram of the electronic circuit for generalized synchronization. Here, Lorenz is driven and Modified Lorenz is the driver.
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagrams. (a) Modified Lorenz system (driver). (b) Lorenz system (driven).
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Variation of RMS value of error with coupling c' for different values of noise intensity D. As evident from the figure, noise destroys synchronization.
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Variation of synchronization threshold for different values of coupling strength (c') and noise intensity (D)
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagrams. (a) Variation of RMS value of error with coupling c' for different values of noise intensity D. Here, results are obtained numerically. (b) Variation of maximum conditional Lyapunov exponent with coupling (c') for different noise intensity D.
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Date of download: 10/29/2017 Copyright © ASME. All rights reserved. From: Effect of Noise on Generalized Synchronization: An Experimental Perspective J. Comput. Nonlinear Dynam. 2012;8(3): doi: / Figure Legend: Circuit diagrams. (a) Variation of RMS value of error with coupling c' for different values of noise intensity D when Lorenz is the driven system and the modified Lorenz is the driver. (b) Variation of maximum conditional Lyapunov exponent of Lorenz system with coupling (c') for different noise intensity D.
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