Preservation Theorems for Transducer Outputs
Abstract
Suppose we have a deterministic finite-state transducer A and an infinite word x, and run A on x to obtain an infinite word A(x). Which properties of x are guaranteed to also hold for A(x)? In this paper, we study this preservation question for various well-known combinatorial properties, e.g., recurrence, being morphic, and having factor frequencies. The celebrated Krohn-Rhodes theorem provides the framework for proving our preservation results, and our techniques are based on the ergodic theory of symbolic dynamical systems, i.e., shift spaces.
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