Abstract
New morphic characterizations in the form of a noted Chomsky-Schützenberger theorem are established for the classes of regular languages, of context-free languages and of languages accepted by chemical reaction automata. Our results include the following:
(i) Each λ-free regular language R can be expressed as R = h(T k ∩ FR) for some 2-star language FR, an extended 2-star language T k and a weak coding h.
(ii) Each λ-free context-free language L can be expressed as L = h(D n ∩ FL) for some 2-local language FL and a projection h.
(iii) A language L is accepted by a chemical reaction automaton iff there exist a 2-local language FL and a weak coding h such that L = h(B n ∩ FL),
where D n and B n are a Dyck set and a partially balanced language defined over the n-letter alphabet, respectively.
These characterizations improve or shed new light on the previous results.
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