On equivalence, languages equivalence and minimization of multi-letter and multi-letter measure-many quantum automata

Abstract

We first show that given a k1-letter quantum finite automata A1 and a k2-letter quantum finite automata A2 over the same input alphabet , they are equivalent if and only if they are (n12+n22-1)||k-1+k-equivalent where n1, i=1,2, are the numbers of state in Ai respectively, and k=\k1,k2\. By applying a method, due to the author, used to deal with the equivalence problem of measure many one-way quantum finite automata, we also show that a k1-letter measure many quantum finite automaton A1 and a k2-letter measure many quantum finite automaton A2 are equivalent if and only if they are (n12+n22-1)||k-1+k-equivalent where ni, i=1,2, are the numbers of state in Ai respectively, and k=\k1,k2\. Next, we study the language equivalence problem of those two kinds of quantum finite automata. We show that for k-letter quantum finite automata, the non-strict cut-point language equivalence problem is undecidable, i.e., it is undecidable whether L≥λ(A1)=L≥λ(A2) where 0<λ≤ 1 and Ai are ki-letter quantum finite automata. Further, we show that both strict and non-strict cut-point language equivalence problem for k-letter measure many quantum finite automata are undecidable. The direct consequences of the above outcomes are summarized in the paper. Finally, we comment on existing proofs about the minimization problem of one way quantum finite automata not only because we have been showing great interest in this kind of problem, which is very important in classical automata theory, but also due to that the problem itself, personally, is a challenge. This problem actually remains open.