Dynamical Symmetry Breaking of Infinite-Dimensional Stochastic System

Abstract: The mapping relationship between the symmetry and the conserved quantity inspired researchers to seek the conserved quantity from the viewpoint of the symmetry for the dynamic systems. However, the symmetry breaking in the dynamic systems is more common than the symmetry in the engineering. Thus, as the supplement of our previous work on the symmetry breaking of infinite-dimensional deterministic dynamic systems, the dynamical symmetry breaking of infinite-dimensional stochastic systems is discussed in this pa… Show more

“…At this time, the conditional symmetry could be marked by 'two-jump polarity balance' or 'more-jump polarity balance'. Like system (12), here, the polarity reversal of z is washed out by the offset boosting in the dimensions of x and y. This time, we can see that the direction of the coexisting attractors does not change in the x and y dimensions but turns down in the z-axis, as shown in Figure 17.…”

“…Various synchronization phenomena can be found in a bidirectionally coupled double scroll circuit [11]. An infinitedimensional stochastic system may still own the symmetric structure [12], and multistable dynamics and control can be realized in a symmetric 4D memristive system [13]. But for asymmetric systems, any polarity disturbance will destroy the solution.…”

Symmetric Strange Attractors: A Review of Symmetry and Conditional Symmetry

“…At this time, the conditional symmetry could be marked by 'two-jump polarity balance' or 'more-jump polarity balance'. Like system (12), here, the polarity reversal of z is washed out by the offset boosting in the dimensions of x and y. This time, we can see that the direction of the coexisting attractors does not change in the x and y dimensions but turns down in the z-axis, as shown in Figure 17.…”

“…Various synchronization phenomena can be found in a bidirectionally coupled double scroll circuit [11]. An infinitedimensional stochastic system may still own the symmetric structure [12], and multistable dynamics and control can be realized in a symmetric 4D memristive system [13]. But for asymmetric systems, any polarity disturbance will destroy the solution.…”

Symmetric Strange Attractors: A Review of Symmetry and Conditional Symmetry

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