Abstract
Let p be a fixed nonnegative integer. We prove the Ehrenfeucht Conjecture for morphisms having deciphering delay bounded by p. In other words, we show that for each language L over a finite alphabet there exists a finite subset F of L such that for arbitrary morphisms h and g having deciphering delay bounded by p, the equation h( x) = g( x) holds for all x in L if and only if it holds for all x in F.
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