A Tight Lower Bound for Streett Complementation

Abstract

Finite automata on infinite words (ω-automata) proved to be a powerful weapon for modeling and reasoning infinite behaviors of reactive systems. Complementation of ω-automata is crucial in many of these applications. But the problem is non-trivial; even after extensive study during the past four decades, we still have an important type of ω-automata, namely Streett automata, for which the gap between the current best lower bound 2(n nk) and upper bound 2(nk nk) is substantial, for the Streett index size k can be exponential in the number of states n. In arXiv:1102.2960 we showed a construction for complementing Streett automata with the upper bound 2O(n n+nk k) for k = O(n) and 2O(n2 n) for k=ω(n). In this paper we establish a matching lower bound 2(n n+nk k) for k = O(n) and 2(n2 n) for k = ω(n), and therefore showing that the construction is asymptotically optimal with respect to the 2(·) notation.