Viliam Geffert scite author profile

We present the first (polynomial-time) algorithm for reducing a given deterministic finite state automaton (DFA) into a hyperminimized DFA, which may have fewer states than the classically minimized DFA. The price we pay is that the language recognized by the new machine can differ from the original on a finite number of inputs. These hyper-minimized automata are optimal, in the sense that every DFA with fewer states must disagree on infinitely many inputs. With small modifications, the construction works also for finite state transducers producing outputs. Within a class of finitely differing languages, the hyper-minimized automaton is not necessarily unique. There may exist several non-isomorphic machines using the minimum number of states, each accepting a separate language finitely-different from the original one. We will show that there are large structural similarities among all these smallest automata.

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Geffert¹

1991

RAIRO-Theor. Inf. Appl.

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Complementing two-way finite automata

Geffert¹,

Mereghetti²,

Pighizzini³

2007

Information and Computation

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Converting two-way nondeterministic unary automata into simpler automata

Geffert

Mereghetti

Pighizzini

2003

Theoretical Computer Science

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Nondeterministic Computations in Sublogarithmic Space and Space Constructibility

Geffert¹

1991

SIAM J. Comput.

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Viliam Geffert

Hyper-minimizing minimized deterministic finite state automata

Normal forms for phrase-structure grammars

Complementing two-way finite automata

Converting two-way nondeterministic unary automata into simpler automata

Nondeterministic Computations in Sublogarithmic Space and Space Constructibility

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