Complexity and Expressivity of Branching- and Alternating-Time Temporal
  Logics with Finitely Many Variables

A David; AP Sistla; D Walther; E Hemaspaandra; EA Emerson; EA Emerson; EM Clarke; EM Clarke; H Ditmarsch van; I Nishimura; Jan Plaza; JY Halpern; JY Halpern; M Huth; M Reynolds; M Rybakov; MC Nagle; MJ Fischer; P Blackburn; R Alur; R Fagin; S Demri; S Demri; S Schewe; V Goranko; V Goranko; V Goranko; V Švejdar; Valentin Goranko; W Hoek van der; Y Shoham

research

Complexity and Expressivity of Branching- and Alternating-Time Temporal Logics with Finitely Many Variables

Authors: A David
AP Sistla
D Walther
E Hemaspaandra
EA Emerson
EA Emerson
EM Clarke
EM Clarke
H Ditmarsch van
I Nishimura
Jan Plaza
JY Halpern
JY Halpern
M Huth
M Reynolds
M Rybakov
MC Nagle
MJ Fischer
P Blackburn
R Alur
R Fagin
S Demri
S Demri
S Schewe
V Goranko
V Goranko
V Goranko
V Švejdar
Valentin Goranko
W Hoek van der
Y Shoham
Publication date: 18 January 2019
Publisher: 'Springer Science and Business Media LLC'
Doi

Abstract

We show that Branching-time temporal logics CTL and CTL*, as well as Alternating-time temporal logics ATL and ATL*, are as semantically expressive in the language with a single propositional variable as they are in the full language, i.e., with an unlimited supply of propositional variables. It follows that satisfiability for CTL, as well as for ATL, with a single variable is EXPTIME-complete, while satisfiability for CTL*, as well as for ATL*, with a single variable is 2EXPTIME-complete,--i.e., for these logics, the satisfiability for formulas with only one variable is as hard as satisfiability for arbitrary formulas.Comment: Prefinal version of the published pape

Similar works

Full text

Available Versions

Crossref

Last time updated on 10/08/2021