Myhill-Nerode Relation for Sequentiable Structures

Published 8 Jun 2017 in cs.FL | (1706.02910v1)

Abstract: Sequentiable structures are a subclass of monoids that generalise the free monoids and the monoid of non-negative real numbers with addition. In this paper we consider functions $f:\Sigma^*\rightarrow {\cal M}$ and define the Myhill-Nerode relation for these functions. We prove that a function of finite index, $n$, can be represented with a subsequential transducer with $n$ states.

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