Bibliography

Major publications by the team in recent years

1F. Blanqui.

Definitions by rewriting in the Calculus of Constructions, in: Mathematical Structures in Computer Science, 2005, vol. 15, n^o 1, pp. 37-92. [ DOI : 10.1017/S0960129504004426 ]

http://hal.inria.fr/inria-00105648/en/
2F. Blanqui, A. Koprowski.

CoLoR: a Coq library on well-founded rewrite relations and its application to the automated verification of termination certificates, in: Mathematical Structures in Computer Science, 2011, vol. 21, n^o 4, pp. 827-859.

http://hal.inria.fr/inria-00543157/en/
3M. Boespflug.

Conception d'un noyau de vérification de preuves pour le lambda-Pi-calcul modulo, École Polytechnique, 2011.
4G. Burel.

Experimenting with Deduction Modulo, in: CADE 2011, V. Sofronie-Stokkermans, N. Bjørner (editors), Lecture Notes in Artificial Intelligence, Springer, 2011, vol. 6803, pp. 162–176.
5G. Dowek.

Polarized Resolution Modulo, in: IFIP Theoretical Computer Science, 2010.
6G. Dowek, T. Hardin, C. Kirchner.

Theorem proving modulo, in: Journal of Automated Reasoning, 2003, vol. 31, pp. 33-73.
7C. Dubois, T. Hardin, V. Donzeau-Gouge.

Building certified components within FOCAL, in: Revised Selected Papers from the Fifth Symposium on Trends in Functional Programming, TFP 2004, München, Germany, 25-26 November 2004, H.-W. Loidl (editor), Trends in Functional Programming, Intellect, 2006, vol. 5, pp. 33-48.
8O. Hermant.

Resolution is Cut-Free, in: Journal of Automated Reasoning, March 2010, vol. 44, n^o 3, pp. 245-276.
9M. Jacquel, K. Berkani, D. Delahaye, C. Dubois.

Verifying B Proof Rules using Deep Embedding and Automated Theorem Proving, in: Software and Systems Modeling (SoSyM), June 2013.
10M. Jacquel, K. Berkani, D. Delahaye, C. Dubois.

Tableaux Modulo Theories Using Superdeduction, in: Global Journal of Advanced Software Engineering (GJASE), December 2014, vol. 1, pp. 1 - 13. [ DOI : 10.1007/978-3-642-31365-3_26 ]

https://hal.archives-ouvertes.fr/hal-01099338

Publications of the year

Doctoral Dissertations and Habilitation Theses

11K. Q. Ly.

Automated verification of termination certificates, Université Joseph Fourier, October 2014.

https://hal.inria.fr/tel-01097793

Articles in International Peer-Reviewed Journals

12A. Assaf, A. Díaz-Caro, S. Perdrix, C. Tasson, B. Valiron.

Call-by-value, call-by-name and the vectorial behaviour of the algebraic λ-calculus, in: Logical Methods in Computer Science, December 2014, vol. 10:4, n^o 8, 40 p. [ DOI : 10.2168/LMCS-10(4:8)2014 ]

https://hal.inria.fr/hal-01097602
13M. Jacquel, K. Berkani, D. Delahaye, C. Dubois.

Tableaux Modulo Theories Using Superdeduction, in: Global Journal of Advanced Software Engineering (GJASE), December 2014, vol. 1, pp. 1 - 13. [ DOI : 10.1007/978-3-642-31365-3_26 ]

https://hal.archives-ouvertes.fr/hal-01099338

Invited Conferences

14G. Dowek.

Deduction modulo theory, in: All about proofs. Proofs for all., Wien, Austria, July 2014.

https://hal.inria.fr/hal-01101829

International Conferences with Proceedings

15G. Burel.

Cut Admissibility by Saturation, in: Joint International Conference, RTA-TLCA, Vienna, Austria, G. Dowek (editor), Lecture Notes in Computer Science, Springer, July 2014, vol. 8560, pp. 124-138. [ DOI : 10.1007/978-3-319-08918-8_9 ]

https://hal.inria.fr/hal-01097428
16S. Cruanes.

Logtk : A Logic ToolKit for Automated Reasoning and its Implementation, in: 4th Workshop on Practical Aspects of Automated Reasoning, Vienna, Austria, July 2014.

https://hal.inria.fr/hal-01101057

Conferences without Proceedings

17P. Halmagrand.

Using Deduction Modulo in Set Theory, in: SETS14, 1st International Workshop about Sets and Tools, Toulouse, France, June 2014, 12 p.

https://hal.inria.fr/hal-01100512

Other Publications

18A. Assaf.

A calculus of constructions with explicit subtyping, 2014.

https://hal.archives-ouvertes.fr/hal-01097401
19A. Assaf, G. Burel.

Translating HOL to Dedukti, 2014.

https://hal.archives-ouvertes.fr/hal-01097412
20F. Blanqui.

A point on fixpoints in posets, January 2014.

https://hal.inria.fr/hal-01097809
21R. Cauderlier, C. Dubois.

Objects and subtyping in the λΠ-calculus modulo, December 2014.

https://hal.inria.fr/hal-01097444
22G. Dowek.

Models and termination of proof-reduction in the λΠ-calculus modulo theory, January 2015.

https://hal.inria.fr/hal-01101834
23G. Dowek, Y. Jiang.

A Logical Approach to CTL, January 2014.

https://hal.inria.fr/hal-00919467
24G. Dowek, Y. Jiang.

Axiomatizing truth in a finite model, January 2014.

https://hal.inria.fr/hal-00919469
25G. Dowek, Y. Jiang.

Cut-elimination and the decidability of reachability in alternating pushdown systems, January 2015.

https://hal.inria.fr/hal-01101835
26A. Díaz-Caro, G. Dowek.

Simply Typed Lambda-Calculus Modulo Type Isomorphisms, August 2014.

https://hal.inria.fr/hal-01109104
27R. Saillard.

Dedukti : un vérificateur de preuves universel, June 2014, Journées de seconde année de l'Ecole Doctorale à Mines ParisTech.

https://hal-mines-paristech.archives-ouvertes.fr/hal-01100519

References in notes

28A. Asperti, W. Ricciotti, C. Sacerdoti Coen, E. Tassi.

A compact kernel for the calculus of inductive constructions, in: Sadhana, 2009, vol. 34, n^o 1, pp. 71-144.

http://dx.doi.org/10.1007/s12046-009-0003-3
29L. Benthem Jutting, J. McKinna, R. Pollack.

Checking algorithms for Pure Type Systems, in: Types for Proofs and Programs, H. Barendregt, T. Nipkow (editors), Lecture Notes in Computer Science, Springer Berlin Heidelberg, 1994, vol. 806, pp. 19-61.
30Y. Bertot, P. Castéran.

Interactive Theorem Proving and Program Development Coq'Art: The Calculus of Inductive Constructions, Springer-Verlag, 2004.
31F. Blanqui.

Terminaison des systèmes de réécriture d'ordre supérieur basée sur la notion de clôture de calculabilité, Université Paris-Diderot - Paris VII, July 2012, HDR.

http://tel.archives-ouvertes.fr/tel-00724233
32D. Cousineau, G. Dowek.

Embedding Pure Type Systems in the lambda-Pi-calculus modulo, in: Typed lambda calculi and applications, S. Ronchi della Rocca (editor), Lecture Notes in Computer Science, Springer-Verlag, 2007, vol. 4583, pp. 102-117.
33D. Delahaye, D. Doligez, F. Gilbert, P. Halmagrand, O. Hermant.

Proof Certification in Zenon Modulo: When Achilles Uses Deduction Modulo to Outrun the Tortoise with Shorter Steps, in: IWIL - 10th International Workshop on the Implementation of Logics - 2013, Stellenbosch, South Africa, S. Schulz, G. Sutcliffe, B. Konev (editors), EasyChair, December 2013.

https://hal.inria.fr/hal-00909688
34D. Delahaye, D. Doligez, F. Gilbert, P. Halmagrand, O. Hermant.

Zenon Modulo: When Achilles Outruns the Tortoise using Deduction Modulo, in: LPAR - Logic for Programming Artificial Intelligence and Reasoning - 2013, Stellenbosch, South Africa, K. McMillan, A. Middeldorp, A. Voronkov (editors), Springer, December 2013, vol. 8312, pp. 274-290. [ DOI : 10.1007/978-3-642-45221-5_20 ]

https://hal.inria.fr/hal-00909784
35D. Delahaye, M. Jacquel.

Recovering Intuition from Automated Formal Proofs using Tableaux with Superdeduction, in: electronic Journal of Mathematics and Technology, February 2013, vol. 7, n^o 2, pp. 1 - 20.

https://hal.archives-ouvertes.fr/hal-01099371
36R. Gandy.

Church's Thesis and Principles for Mechanisms, in: The Kleene Symposium, North-Holland, 1980.
37J.-Y. Girard, Y. Lafont, P. Taylor.

Proofs and Types, Cambridge University Press, 1988.
38R. Harper, F. Honsell, G. Plotkin.

A Framework for Defining Logics, in: Journal of the association for computing machinery, 1993, pp. 194–204.
39J. Harrison.

HOL Light: An Overview, in: Theorem Proving in Higher Order Logics, S. Berghofer, T. Nipkow, C. Urban, M. Wenzel (editors), Lecture Notes in Computer Science, Springer Berlin Heidelberg, 2009, vol. 5674, pp. 60-66.

http://dx.doi.org/10.1007/978-3-642-03359-9_4
40L. M. Hines.

STR $\dot{+}$ VE $\subseteq$ : The STR $\dot{+}$ VE-Based Subset Prover, in: Conference on Automated Deduction (CADE), Kaiserslautern (Germany), LNCS, Springer, July 1990, pp. 193–206.
41J. Hurd.

The OpenTheory Standard Theory Library, in: NASA Formal Methods, M. Bobaru, K. Havelund, G. Holzmann, R. Joshi (editors), Lecture Notes in Computer Science, Springer Berlin Heidelberg, 2011, vol. 6617, pp. 177-191.

http://dx.doi.org/10.1007/978-3-642-20398-5_14
42M. Jacquel, K. Berkani, D. Delahaye, C. Dubois.

Verifying B Proof Rules using Deep Embedding and Automated Theorem Proving, in: Software Engineering and Formal Methods, November 2011, vol. 7041, pp. 253-268. [ DOI : 10.1007/978-3-642-24690-6_18 ]

https://hal.archives-ouvertes.fr/hal-00722373
43J.-P. Jouannaud, A. Rubio.

Polymorphic Higher-Order Recursive Path Orderings, in: Journal of the ACM, 2007, vol. 54, n^o 1, pp. 1-48.
44J.-P. Jouannaud, A. Rubio.

The Higher-Order Recursive Path Ordering, in: Proceedings of the 14th IEEE Symposium on Logic in Computer Science, 1999.
45A. Kersani, N. Peltier.

Combining Superposition and Induction: A Practical Realization, in: FroCoS 2013 - 9th International Symposium on s of Combining Systems (co-located with TABLEAUX 2013), Nancy, France, P. Fontaine, C. Ringeissen, R. A. Schmidt (editors), Lecture Notes in Computer Science (LNCS), Springer, September 2013, vol. 8152, pp. 7-22, Session: Inductive Theorem Proving. [ DOI : 10.1007/978-3-642-40885-4_2 ]

https://hal.archives-ouvertes.fr/hal-00934610
46K. Korovin.

iProver – An Instantiation-Based Theorem Prover for First-Order Logic (System Description), in: IJCAR, A. Armando, P. Baumgartner (editors), Lecture Notes in Artificial Intelligence, Springer, 2008, vol. 5195, pp. 292-298.
47F. Rabe, M. Kohlhase.

A Scalable Module System, in: Inf. Comput., September 2013, vol. 230, pp. 1–54.

http://dx.doi.org/10.1016/j.ic.2013.06.001
48B. R. Salinas.

Puntos fijos en conjuntos ordenados, Publicaciones del Seminario Matematico Garcia de Galdeano, Consejo Superior de Investigationes Cientificas, Facultad de Ciencas de Zaragoza, 1969, English summary on http://www.ams.org/mathscinet-getitem?mr=250943 .
49R. Statman.

A New Type Assignment for Strongly Normalizable Terms, in: Computer Science Logic 2013 (CSL 2013), Dagstuhl, Germany, S. R. D. Rocca (editor), Leibniz International Proceedings in Informatics (LIPIcs), Schloss Dagstuhl–Leibniz-Zentrum fuer Informatik, 2013, vol. 23, pp. 634–652.

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