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Behaviours of Unary Quantum Automata

100%

Bianchi M. P. , Palano B.

2010

tom Vol. 104, nr 1/2

1-15

We study the stochastic events induced by MM-qfa's working on unary alphabets. We give two algorithms for unary MM-qfa's: the first computes the dimension of the ergodic and transient components of the non halting subspace, while the second tests whether the induced event is d-periodic. These algorithms run in polynomial time whenever the MM-qfa given in input has complex amplitudes with rational components. We also characterize the recognition power of unary MM-qfa's, by proving that any unary regular language can be accepted by a MM-qfa with constant cut point and isolation. Yet, the amount of states of the resulting MM-qfa is linear in the size of the corresponding minimal dfa. We also single out families of unary regular languages for which the size of the accepting MM-qfa's can be exponentially decreased.

On the Size of Unary Probabilistic and Nondeterministic Automata

80%

Bianchi M. P. , Mereghetti C. , Palano B. , Pighizzini G.

tom Vol. 112, nr 2/3

119-135

We investigate and compare the descriptional power of unary probabilistic and nondeterministic automata (pfa's and nfa's, respectively). We show the existence of a family of languages hard for pfa’s in the following sense: For any positive integer d, there exists a unary d-cyclic language such that any pfa accepting it requires d states, as the smallest deterministic automaton. On the other hand, we prove that there exist infinitely many languages having pfa’s which from one side do not match a known optimal state lower bound and, on the other side, they are smaller than nfa’s which, in turn, are smaller than deterministic automata.