Concurrent MetateM is a multi-agent language in which each agent is programmed using a set of (augmented) temporal logic specifications of the behaviour it should exhibit. These specifications are executed directly to generate the behaviour of the agent. As a result, there is no risk of invalidating the logic as with systems where logical specification must first be translated to a lower-level implementation.
Contents
- Temporal Connectives
- Weak last
- Strong last
- Was
- Heretofore
- Since
- Zince or weak since
- Next
- Sometime
- Always
- Until
- Unless
- References
The root of the MetateM concept is Gabbay's separation theorem; any arbitrary temporal logic formula can be rewritten in a logically equivalent past → future form. Execution proceeds by a process of continually matching rules against a history, and firing those rules when antecedents are satisfied. Any instantiated future-time consequents become commitments which must subsequently be satisfied, iteratively generating a model for the formula made up of the program rules.
Temporal Connectives
The Temporal Connectives of Concurrent MetateM can divided into two categories, as follows:
The connectives {◎,●,◆,■,◯,◇,□} are unary; the remainder are binary.
Weak last
●ρ is satisfied now if ρ was true in the previous time. If ●ρ is interpreted at the beginning of time, it is satisfied despite there being no actual previous time. Hence "weak" last.
Strong last
◎ρ is satisfied now if ρ was true in the previous time. If ◎ρ is interpreted at the beginning of time, it is not satisfied because there is no actual previous time. Hence "strong" last.
Was
◆ρ is satisfied now if ρ was true in any previous moment in time.
Heretofore
■ρ is satisfied now if ρ was true in every previous moment in time.
Since
ρSψ is satisfied now if ψ is true at any previous moment and ρ is true at every moment after that moment.
Zince, or weak since
ρZψ is satisfied now if (ψ is true at any previous moment and ρ is true at every moment after that moment) OR ψ has not happened in the past.
Next
◯ρ is satisfied now if ρ is true in the next moment in time.
Sometime
◇ρ is satisfied now if ρ is true now or in any future moment in time.
Always
□ρ is satisfied now if ρ is true now and in every future moment in time.
Until
ρUψ is satisfied now if ψ is true at any future moment and ρ is true at every moment prior.
Unless
ρWψ is satisfied now if (ψ is true at any future moment and ρ is true at every moment prior) OR ψ does not happen in the future.