Polynomial maps on the monoid of words
Abstract
We briefly visit the theory of polynomial and semipolynomial maps defined on an arbitrary monoid, with range a commutative group. Then we characterize the space P(S,C) of polynomial maps f:S C, where S=A* is the monoid of words based on an arbitrary alphabet A under concatenation, and we use this characterization to prove that if there exists a monoid S∈CS such that SP(S,C)≠ P(S,C), then also SP(A*,C)≠P(A*,C) for a certain alphabet A. We propose as an open problem to prove or disprove that SP(A*,C)=P(A*,C) for arbitrary alphabets A. Our results are motivated by previous work of Shulman.
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