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Labbé Sébastien

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Main Referenced Co-authors
Leroy, Julien  (4)
Arnoux, Pierre (2)
Cassaigne, Julien (2)
Pelantova, Edita (2)
Berthé, Valérie (1)
Main Referenced Disciplines
Mathematics (17)
Human geography & demography (1)

Publications (total 18)

The most downloaded
1474 downloads
Labbé, S. (2016). MATH2010-1 Logiciels mathématiques - Notes de cours. (ULiège - Université de Liège, MATH2010-1 Logiciels mathématiques). https://hdl.handle.net/2268/204748

The most cited

16 citations (Scopus®)

Labbé, S., & Berthé, V. (2015). Factor Complexity of S-adic words generated by the Arnoux-Rauzy-Poincaré Algorithm. Advances in Applied Mathematics, 63, 90-130. doi:10.1016/j.aam.2014.11.001 https://hdl.handle.net/2268/191373

Cassaigne, J., Labbé, S., & Leroy, J. (2017). Balanced sequences of complexity 2n+1. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/212151.

Labbé, S., Starosta, S., & Pelantova, E. (2017). On the Zero Defect Conjecture. European Journal of Combinatorics, 62 (May 2017), 132–146. doi:10.1016/j.ejc.2016.12.006
Peer Reviewed verified by ORBi

Cassaigne, J., Labbé, S., & Leroy, J. (2017). A set of sequences of complexity $2n+1$. In Combinatorics on words (pp. 144-156). Springer, Cham. doi:10.1007/978-3-319-66396-8_14
Peer reviewed

Arnoux, P., & Labbé, S. (2017). On some symmetric multidimensional continued fraction algorithms. Ergodic Theory and Dynamical Systems. doi:10.1017/etds.2016.112
Peer Reviewed verified by ORBi

Labbé, S. (2016). Sébastien Labbé Research Code: slabbe 0.3.b2.

Labbé, S. (2016). 25 solutions pour valoriser la mobilité douce à Liège.

Labbé, S. (2016). MATH2010-1 Logiciels mathématiques - Notes de cours. (ULiège - Université de Liège, MATH2010-1 Logiciels mathématiques).

Labbé, S., & Pelantova, E. (2016). Palindromic sequences generated from marked morphisms. European Journal of Combinatorics, 51, 200-214. doi:10.1016/j.ejc.2015.05.006
Peer Reviewed verified by ORBi

Labbé, S., & Leroy, J. (2016). Bispecial factors in the Brun S-adic system. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/196278.

Labbé, S., & Leroy, J. (2016). Bispecial Factors in the Brun S-Adic System. In S. V. Brlek & C. Reutenauer (Eds.), Developments in Language Theory: 20th International Conference, DLT 2016, Montréal, Canada, July 25-28, 2016, Proceedings (pp. 280-292). Berlin, Heidelberg, Germany: Springer Berlin Heidelberg. doi:10.1007/978-3-662-53132-7_23
Peer reviewed

Labbé, S. (2015). Optional Sage package slabbe-0.2.spkg.

Labbé, S. (14 October 2015). Pisot property for Arnoux-Rauzy-Poincaré algorithm [Paper presentation]. Rencontre de l'ANR DynA3S, LIAFA, Paris.

Labbé, S. (10 March 2015). A d-dimensional extension of Christoffel words [Paper presentation]. Séminaire de l'équipe CALIN, Univ. Paris 13, 10 mars 2015.

Labbé, S., & Labbé, J.-P. (2015). A Perron theorem for matrices with negative entries and applications to Coxeter groups. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/191356.

Labbé, S., & Arnoux, P. (2015). On some symmetric multidimensional continued fraction algorithms. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/191361.

Labbé, S., & Berthé, V. (2015). Factor Complexity of S-adic words generated by the Arnoux-Rauzy-Poincaré Algorithm. Advances in Applied Mathematics, 63, 90-130. doi:10.1016/j.aam.2014.11.001
Peer Reviewed verified by ORBi

Labbé, S., & Reutenauer, C. (2015). A d-dimensional extension of Christoffel words. Discrete and Computational Geometry, 54, 152-181. doi:10.1007/s00454-015-9681-2
Peer Reviewed verified by ORBi

Labbé, S. (2015). 3-dimensional Continued Fraction Algorithms Cheat Sheets. ORBi-University of Liège. https://orbi.uliege.be/handle/2268/191348.

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