[isabelle] post-doctoral position at MSR-INRIA, Paris
Research team: Tools for Proofs, MSR-INRIA Joint Centre
The Microsoft Research-INRIA Joint Centre is offering a 2-year position for a post-doctoral researcher to contribute to the ADN4SE project aiming at extending the proof development environment for TLA+ developed in the Tools for Proofs project (http://msr-inria.com/projects/tools-for-proofs) and applying it for the verification of key components of a real-time operating system.
TLA+ is a language for specifying and reasoning about systems, including concurrent and distributed systems. It is based on first-order logic, set theory, temporal logic, and a module system. TLA+ and its tools have been used in industry for over a decade. More recently, we have extended TLA+ to include hierarchically structured formal proofs that are independent of any proof checker. We have released several versions of the TLAPS proof checker (http://tla.msr-inria.inria.fr/tlaps) and integrated it into the TLA+ Toolbox, an IDE for the TLA+ tools (http://research.microsoft.com/en-us/um/people/lamport/tla/tla.html).
TLAPS and the Toolbox support the top-down development of proofs and the checking of individual proof steps independently of the rest of the proof. This helps users focus on the part of the proof they are working on. Although it is still under active development, TLAPS is already a powerful tool and has been used for a few verification projects, in particular in the realm of distributed algorithms (e.g., http://research.microsoft.com/en-us/um/people/lamport/tla/byzpaxos.html).
TLAPS consists of the Proof Manager (PM, an interpreter for the proof language that computes the proof obligations corresponding to each proof step) and an extensible list of backend provers. Current backends include the tableau prover Zenon, an encoding of TLA+ as an object logic in the Isabelle proof assistant, and a generic backend for SMT solvers. When possible, we expect backend provers to produce a detailed proof that is then checked by Isabelle. In this way, we can obtain high assurance of correctness as well as satisfactory automation.
The current version of the PM handles only the "action" part of TLA+: first-order formulas with primed and unprimed variables, where a variable v is considered to be unrelated to its primed version v'. This allows us to translate non-temporal proof obligations to standard first-order logic, without the overhead associated with an encoding of temporal logic into first-order logic. An extension for handling full TLA+, including its temporal logic for verifying liveness properties, is currently being developed.
Description of the activity of the post-doc
The post-doctoral position is funded by the PIA ADN4SE project (http://www.systematic-paris-region.org/en/projets/adn4se) that develops a real-time operating system and development tools for embedded systems based on PharOS. The system aims at providing certifiable correctness and performance guarantees, and core protocols of the operating system will be formally verified using the TLA+ notation and tools.
Your research will make a key contribution to this verification effort. In particular, you will work with other members of the project, including Damien Doligez, Leslie Lamport, Tomer Libal, and Stephan Merz on extending the TLA+ Proof System and its libraries. You will also work with the project partners of ADN4SE, and in particular members of CEA List, to model the protocols subject to verification. Your contributions will be conceptual, by identifying theories and patterns that underly the verification of the operating system, and practical, by implementing formal libraries and software in order to carry out the verification task.
As time permits and depending on your interests, you will have the opportunity to contribute to further improving the proof checker. This may include:
- adding support for certain TLA+ features that are not yet handled by the PM, such as recursive operator definitions and elaborate patterns for variable bindings;
- integrating new backends to improve the automation of proofs;
- adding validation of proofs by backends whose proofs are not yet checked in the current version.
Skills and profile of the candidate
You should have a solid knowledge of mathematical logic as well as good implementation skills related to symbolic theorem proving. Experience with developing real-time systems are a plus. Our tools are mainly implemented in OCaml. Experience with temporal and modal logics, with interactive theorem provers or with Eclipse could be valuable.
Given the geographical distribution of the members of the team, we highly value a good balance between the ability to work in a team and the capacity to propose initiatives.
The Microsoft Research-INRIA Joint Centre is located on the Campus of Ecole Polytechnique south of Paris, France.
The normal starting date of the contract would be November 2013, but we can arrange for an extremely well-qualified candidate to start sooner.
Candidates should send a resume and the name and e-mail addresses of one or two references to Damien Doligez <damien.doligez at inria.fr>. The deadline for application is July 10, 2013.
This announcement is available at http://www.msr-inria.com/open_positions/post-doc-research-position-on-tla-tools/
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