Fundamental Structure of General Stochastic Dynamical Systems: High-Dimension Case

Fundamental Structure of General Stochastic Dynamical Systems: High-Dimension Case

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No one has proved Pentair Kreepy Krauly Parts that mathematically general stochastic dynamical systems have a special structure.Thus, we introduce a structure of a general stochastic dynamical system.According to scientific understanding, we assert that its deterministic part can be decomposed into three significant parts: the gradient of the potential function, friction matrix and Lorenz matrix.

Our previous work proved this structure for the low-dimension case.In this paper, we prove this structure for CONSOLE PANEL FRONT the high-dimension case.Hence, this structure of general stochastic dynamical systems is fundamental.