Decision problems for patterns
Journal of Computer and System Sciences
Handbook of formal languages, vol. 1
Computers and Intractability: A Guide to the Theory of NP-Completeness
Computers and Intractability: A Guide to the Theory of NP-Completeness
A non-learnable class of E-pattern languages
Theoretical Computer Science - Algorithmic learning theory(ALT 2002)
Discontinuities in pattern inference
Theoretical Computer Science
The unambiguity of segmented morphisms
DLT'07 Proceedings of the 11th international conference on Developments in language theory
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This paper discusses the fundamental combinatorial question of whether or not, for a given string α, there exists a morphism σ such that σ is unambiguous with respect to α, i. e. there exists no other morphism τ satisfying τ(α) = σ(α). While Freydenberger et al. (International Journal of Foundations of Computer Science 17, 2006) characterise those strings for which there exists an unambiguous non-erasing morphism σ, little is known about the unambiguity of erasing morphisms, i.e. morphisms which map symbols onto the empty string. The present paper demonstrates that, in contrast to the main result by Freydenberger et al., the existence of an unambiguous erasing morphisms for a given string can essentially depend on the size of the target alphabet of the morphism. In addition to this, those strings for which there exists an erasing morphism over an infinite target alphabet are characterised, complexity issues are discussed and some sufficient conditions for the (non-)existence of unambiguous erasing morphisms are given.