Abstract
We consider language structures B Σ = (P Σ , ·, ⊗, +, 1,0), where P Σ consists of all subsets of the free monoid σ*; the binary operations ·, ⊗ and + are concatenation, shuffle product and union, respectively, and where the constant 0 is the empty set and the constant 1 is the singleton set containing the empty word. We show that the variety Lang generated by the structures L Σ has no finite axiomatization.
Partially supported by grant No. T7383 of the National Foundation for Scientific Research of Hungary, the Alexander von Humboldt Foundation, and by the US-Hungarian Joint Fund under grant number 351.
Partially supported by the ESPRIT Basic Research Actions No. 6317 ASMICS II.
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ésik, Z., Bertol, M. (1995). Nonfinite axiomatizability of the equational theory of shuffle. In: Fülöp, Z., Gécseg, F. (eds) Automata, Languages and Programming. ICALP 1995. Lecture Notes in Computer Science, vol 944. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-60084-1_60
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DOI: https://doi.org/10.1007/3-540-60084-1_60
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