We study the strength of axioms needed to prove various results related to automata on infinite words and Büchi's theorem on the decidability of the MSO theory of (N, less_or_equal). We prove that the following are equivalent over the weak second-order arithmetic theory RCA: 1. Büchi's complementation theorem for nondeterministic automata on infinite words, 2. the decidability of the depth-n fragment of the MSO theory of (N, less_or_equal), for each n greater than 5, 3. the induction scheme for Sigma^0_2 formulae of arithmetic. Moreover, each of (1)-(3) is equivalent to the additive version of Ramsey's Theorem for pairs, often used in proofs of (1); each of (1)-(3) implies McNaughton's determinisation theorem for automata on infinite words;...
In the past years, extensions of monadic second-order logic (MSO) that can specify boundedness prope...
Almost a century ago, Presburger showed that the first order theory of the natural numbers with addi...
We study word structures of the form (D,<=,P) where D is either N or Z, <= is a linear ordering on D...
We study the strength of axioms needed to prove various results related to automata on infinite word...
This thesis studies certain aspects of Monadic Second-Order logic over infinitewords (MSO) through t...
We prove that, over infinite trees, satisfiability is decidable for Weak Monadic Second-Order Logic...
We study word structures of the form (D, <, P) where D is either N or Z, < is the natural linear ord...
We consider the logic MSO+U, which is monadic second-order logic extended with the unbounding quanti...
We prove the undecidability of MSO on ω-words extended with the second-order predicate U1(X) which s...
AbstractThe main result of this paper is the extension of the theorem of Schützenberger, McNaughton,...
In this thesis, we study the problems of determinisation and complementation of finite automata on i...
We introduce a new class of automata on infinite words, called min-automata. We prove that min-aut...
We introduce partially ordered two-way Büchi automata over infinite words. As for finite words, the ...
We study word structures of the form (D,<,P) where D is either the naturals or the integers with the...
Automata theory arose as an interdisciplinary field, with roots in several scientific domains such a...
In the past years, extensions of monadic second-order logic (MSO) that can specify boundedness prope...
Almost a century ago, Presburger showed that the first order theory of the natural numbers with addi...
We study word structures of the form (D,<=,P) where D is either N or Z, <= is a linear ordering on D...
We study the strength of axioms needed to prove various results related to automata on infinite word...
This thesis studies certain aspects of Monadic Second-Order logic over infinitewords (MSO) through t...
We prove that, over infinite trees, satisfiability is decidable for Weak Monadic Second-Order Logic...
We study word structures of the form (D, <, P) where D is either N or Z, < is the natural linear ord...
We consider the logic MSO+U, which is monadic second-order logic extended with the unbounding quanti...
We prove the undecidability of MSO on ω-words extended with the second-order predicate U1(X) which s...
AbstractThe main result of this paper is the extension of the theorem of Schützenberger, McNaughton,...
In this thesis, we study the problems of determinisation and complementation of finite automata on i...
We introduce a new class of automata on infinite words, called min-automata. We prove that min-aut...
We introduce partially ordered two-way Büchi automata over infinite words. As for finite words, the ...
We study word structures of the form (D,<,P) where D is either the naturals or the integers with the...
Automata theory arose as an interdisciplinary field, with roots in several scientific domains such a...
In the past years, extensions of monadic second-order logic (MSO) that can specify boundedness prope...
Almost a century ago, Presburger showed that the first order theory of the natural numbers with addi...
We study word structures of the form (D,<=,P) where D is either N or Z, <= is a linear ordering on D...