The dominant global state in the asymptotic analysis of 2D systems
نویسندگان
چکیده
The dominant state plays an essential role in the asyntotic analysis of dynamical systems. The global state in a 2D system consists in a sequence, and the existence of a dominant global state means that the free evolution of the global states tends to approximate this sequence, up to the multiplication by a normalizing factor. In this contribution the existence of a global state is proved under the hypothesis that the initial global state is the Fuorier Stieltjes transform of a bounded variation function.
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