State succinctness of two-way finite automata with quantum and classical states

Abstract

Two-way quantum automata with quantum and classical states (2QCFA) were introduced by Ambainis and Watrous in 2002. In this paper we study state succinctness of 2QCFA. For any m∈ Z+ and any ε<1/2, we show that: enumerate there is a promise problem Aeq(m) which can be solved by a 2QCFA with one-sided error ε in a polynomial expected running time with a constant number (that depends neither on m nor on ) of quantum states and O(1ε) classical states, whereas the sizes of the corresponding deterministic finite automata (DFA), two-way nondeterministic finite automata (2NFA) and polynomial expected running time two-way probabilistic finite automata (2PFA) are at least 2m+2, m, and [3]( m)/b, respectively; there exists a language Ltwin(m)=\wcw| w∈\a,b\*\ over the alphabet =\a,b,c\ which can be recognized by a 2QCFA with one-sided error ε in an exponential expected running time with a constant number of quantum states and O(1ε) classical states, whereas the sizes of the corresponding DFA, 2NFA and polynomial expected running time 2PFA are at least 2m, m, and [3]m/b, respectively; enumerate where b is a constant.