Semiflows on finite topological spaces
Abstract
In this paper, we study flows and semiflows defined on any given finite topological T0-space X. We show that there exist non-trivial semiflows on X, unless X is a minimal finite space. Specifically, non-trivial semiflows exist if and only if X contains down beat points, and a non-trivial semiflow is essentially a strong deformation retraction. As a consequence of this result, we provide a new and concise proof that the only flow that can be defined on X is the trivial flow. Finally, we discuss the number of different semiflows that can be defined on X in terms of down beat points and other special points.
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