A Complete Axiomatization of MSO on Infinite Trees

Author

Das, Anupam ; Riba, Colin

Author_Institution

Lab. LIP, ENS de Lyon, Lyon, France

fYear

2015

fDate

6-10 July 2015

Firstpage

390

Lastpage

401

Abstract

We show that an adaptation of Peano´s axioms for second-order arithmetic to the language of MSO completely axiomatizes the theory over infinite trees. This continues a line of work begun by Büchi and Siefkes with axiomatizations of MSO over various classes of linear orders. Our proof formalizes, in the axiomatic theory, a translation of MSO formulas to alternating parity tree automata. The main ingredient is the formalized proof of positional determinacy for the corresponding parity games which, as usual, allows us to complement automata in order to deal with negation of MSO formulas. The Comprehension scheme of monadic second-order logic is used to obtain uniform winning strategies, whereas most usual proofs of positional determinacy rely on forms of the Axiom of Choice or transfinite induction.

Keywords

automata theory; formal languages; formal logic; game theory; theorem proving; trees (mathematics); MSO complete axiomatization; MSO formula translation; MSO language; Peano axioms; alternating parity tree automata; axiom of choice; axiomatic theory; comprehension scheme; formalized proof; infinite trees; linear orders; monadic second-order logic; parity games; positional determinacy; second-order arithmetic; transfinite induction; uniform winning strategy; Automata; Context; Encoding; Games; Mathematical model; Standards; Syntactics; MSO; automata; axiomatization; infinite trees; proof theory;

fLanguage

English

Publisher

ieee

Conference_Titel

Logic in Computer Science (LICS), 2015 30th Annual ACM/IEEE Symposium on

Conference_Location

Kyoto

ISSN

1043-6871

Type

conf

DOI

10.1109/LICS.2015.44

Filename

7174898