Some results on equivalence of multi-letter quantum finite automata

Abstract

Two quantum finite automata are equivalent if for all input string ω over the input alphabet the two automata accept ω with equal probability. In [Theoret. Comput. Sci. 410 (2009) 3006-3017], it was shown that a k1-letter QFA A1 and a k2-letter QFA A2 over =\σ\, are equivalent if and only if they are (n1+n2)4+k-1-equivalent where ni is the number of states of Ai, i=1,2, and k=\k1,k2\. In this letter, we improve the above upper-bound to (n12+n22-1)+k. This also answers an open problem of Qiu et al. [Acta Informatica 48 (2011) 271-290]. Further, we show that, in the case of =\σ1,...,σt\ with 2≤ t<∞, there exists an integer z such that A1 and A2 are equivalent if and only if they satisfy z-equivalent.