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ICALP
2009
Springer
2009
Springer
Complexity of Model Checking Recursion Schemes for Fragments of the Modal Mu-Calculus
Ong has shown that the modal mu-calculus model checking problem (equivalently, the alternating parity tree automaton (APT) acceptance problem) of possibly-infinite ranked trees generated by order-n recursion schemes is n-EXPTIME complete. We consider two subclasses of APT and investigate the complexity of the respective acceptance problems. The main results are that, for APT with a single priority, the problem is still n-EXPTIME complete; whereas, for APT with a disjunctive transition function, the problem is (n - 1)-EXPTIME complete. This study was motivated by Kobayashi's recent work showing that the resource usage verification for functional programs can be reduced to the model checking of recursion schemes. As an application, we show that the resource usage verification problem is (n - 1)-EXPTIME complete.
Real-time TrafficICALP 2009 | Model Checking Problem | Resource Usage Verification | Theoretical Computer Science | Usage Verification Problem |
Related Content
| Added | 03 Dec 2009 |
| Updated | 03 Dec 2009 |
| Type | Conference |
| Year | 2009 |
| Where | ICALP |
| Authors | Naoki Kobayashi, C.-H. Luke Ong |
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