AbstractWe prove there is a strict hierarchy of expressive power according to the Until depth of linear temporal logic (LTL) formulas: for each k, there is a natural property, based on quantitative fairness, that is not expressible with k nestings of Until operators, regardless of the number of applications of other operators, but is expressible by a formula with Until depth k+1. Our proof uses a new Ehrenfeucht–Fraı̈ssé (EF) game designed specifically for LTL. These properties can all be expressed in first-order logic with quantifier depth and size O(logk), and we use them to observe some interesting relationships between LTL and first-order expressibility. We note that our Until hierarchy proof for LTL carries over to the branching time l...
As specifications and verifications of concurrent systems employ Linear Temporal Logic (LTL), it is ...
A seminal result of Kamp is that over the reals Linear Temporal Logic (LTL) has the same expressive ...
Model checking linear-time properties expressed in first-order logic hasnon-elementary complexity, a...
AbstractWe prove there is a strict hierarchy of expressive power according to the Until depth of lin...
(from [TW96]) We reveal an intimate connection between semidirect products of finite semigroups and...
AbstractMany temporal logics have been suggested as branching time specification formalisms during t...
We study the expressive power of linear propositional temporal logic interpreted on finite sequences...
AbstractWe study the expressive power of linear propositional temporal logic interpreted on finite s...
Many temporal logics have been suggested as branching time specification formalisms during the past ...
A seminal result of Kamp is that over the reals Linear Temporal Logic (LTL) has the same expressive ...
AbstractWe investigate the power of first-order logic with only two variables over ω-words and finit...
We prove weak (finite set of premises) completeness theorem for extended propositional linear time t...
Linear temporal logic was introduced in order to reason about reactive systems. It is often conside...
While specifications and verifications of concurrent systems employ Linear Temporal Logic (), it is ...
Until is a notoriously difficult temporal operator as it is both existential and universal at the sa...
As specifications and verifications of concurrent systems employ Linear Temporal Logic (LTL), it is ...
A seminal result of Kamp is that over the reals Linear Temporal Logic (LTL) has the same expressive ...
Model checking linear-time properties expressed in first-order logic hasnon-elementary complexity, a...
AbstractWe prove there is a strict hierarchy of expressive power according to the Until depth of lin...
(from [TW96]) We reveal an intimate connection between semidirect products of finite semigroups and...
AbstractMany temporal logics have been suggested as branching time specification formalisms during t...
We study the expressive power of linear propositional temporal logic interpreted on finite sequences...
AbstractWe study the expressive power of linear propositional temporal logic interpreted on finite s...
Many temporal logics have been suggested as branching time specification formalisms during the past ...
A seminal result of Kamp is that over the reals Linear Temporal Logic (LTL) has the same expressive ...
AbstractWe investigate the power of first-order logic with only two variables over ω-words and finit...
We prove weak (finite set of premises) completeness theorem for extended propositional linear time t...
Linear temporal logic was introduced in order to reason about reactive systems. It is often conside...
While specifications and verifications of concurrent systems employ Linear Temporal Logic (), it is ...
Until is a notoriously difficult temporal operator as it is both existential and universal at the sa...
As specifications and verifications of concurrent systems employ Linear Temporal Logic (LTL), it is ...
A seminal result of Kamp is that over the reals Linear Temporal Logic (LTL) has the same expressive ...
Model checking linear-time properties expressed in first-order logic hasnon-elementary complexity, a...