Dynamics of Products of Matrices in Max Algebra
Abstract
The aim of this manuscript is to understand the dynamics of matrix products in a max algebra. A consequence of the Perron-Fr\"obenius theorem on periodic points of a nonnegative matrix is generalized to a max algebra setting. The same is then studied for a finite product associated to a p-lettered word on N letters arising from a finite collection of nonnegative matrices, with each member having its maximum circuit geometric mean at most 1.
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