A Local Stochastic Algorithm for Separation in Heterogeneous Self-Organizing Particle Systems
share
We investigate stochastic, distributed algorithms that can accomplish separation and integration behaviors in self-organizing particle systems, an abstraction of programmable matter. These particle systems are composed of individual computational units known as particles that each have limited memory, strictly local communication abilities, and modest computational power, and which collectively solve system-wide problems of movement and coordination. In this work, we extend the usual notion of a particle system to treat heterogeneous systems by considering particles of different colors. We present a fully distributed, asynchronous, stochastic algorithm for separation, where the particle system self-organizes into clustered color classes using only local information about each particle's preference for being near others of the same color. We rigorously analyze the correctness and convergence of our distributed, stochastic algorithm by leveraging techniques from Markov chain analysis, proving that under certain mild conditions separation occurs with high probability. These theoretical results are complemented by simulations.
READ FULL TEXT