On the basins of attraction of the regular autonomous asynchronous systems

Abstract: The Boolean autonomous dynamical systems, also called regular autonomous asynchronous systems are systems whose 'vector field' is a function {\Phi}:{0,1}^{n}{\to}{0,1}^{n} and time is discrete or continuous. While the synchronous systems have their coordinate functions {\Phi}{1},...,{\Phi}{n} computed at the same time: {\Phi},{\Phi}{\circ}{\Phi},{\Phi}{\circ}{\Phi}{\circ}{\Phi},... the asynchronous systems have {\Phi}{1},...,{\Phi}{n} computed independently on each other. The purpose of the paper is that of studying the basins of attraction of the fixed points, of the orbits and of the {\omega}-limit sets of the regular autonomous asynchronous systems. The bibliography consists in analogies.