  | Menet, Q., & Papathanasiou, D. (2023). Structure of sets of bounded sequences with a prescribed number of accumulation points. Proceedings of the American Mathematical Society. doi:10.1090/proc/16663  Peer Reviewed verified by ORBi |
 | Menet, Q. (2022). Inverse of frequently hypercyclic operators. Journal of the Institute of Mathematics of Jussieu. doi:10.1017/S1474748021000025 Peer reviewed |
 | Martin, Ö., Menet, Q., & Puig, Y. (July 2022). Disjoint frequently hypercyclic pseudo-shifts. Journal of Functional Analysis, 283 (1), 109474. doi:10.1016/j.jfa.2022.109474 Peer Reviewed verified by ORBi |
 | Menet, Q., Bayart, F., & Costa, F. J. (2022). Common hypercyclic vectors and dimension of the parameter set. Indiana University Mathematics Journal, 71 (4), 1763-1795. Peer reviewed |
 | Charpentier, S., Grosse-Erdmann, K., & Menet, Q. (01 December 2021). Chaos and frequent hypercyclicity for weighted shifts. Ergodic Theory and Dynamical Systems, 41, 3634-3670. Peer Reviewed verified by ORBi |
Grivaux, S., Matheron, E., & Menet, Q. (01 October 2021). Does a typical lp-space contraction have a non-trivial invariant subspace? Transactions of the American Mathematical Society, 374 (10), 7359-7410. Peer Reviewed verified by ORBi |
Menet, Q. (01 August 2021). Invariant subspaces for Fréchet spaces without continuous norm. Proceedings of the American Mathematical Society, 149 (8), 3379-3393. Peer Reviewed verified by ORBi |
Grivaux, S., Matheron, E., & Menet, Q. (23 June 2021). Linear dynamical systems on Hilbert spaces: Typical properties and explicit examples. Memoirs of the American Mathematical Society, 269 (1315), 1-147. Peer reviewed |
Ernst, R., Esser, C., & Menet, Q. (06 March 2021). U-frequent hypercyclicity notions and related weighted densities. Israel Journal of Mathematics, 241, 817-848. Peer Reviewed verified by ORBi |
Menet, Q. (01 September 2020). Inverse of U-frequently hypercyclic operators. Journal of Functional Analysis, 279 (4). Peer Reviewed verified by ORBi |
Menet, Q. (15 February 2020). A bridge between U-frequent hypercyclicity and frequent hypercyclicity. Journal of Mathematical Analysis and Applications, 482 (2). Peer Reviewed verified by ORBi |
Bès, J., Menet, Q., Peris, A., & Puig, Y. (15 January 2019). Strong transitivity properties for operators. Journal of Differential Equations, 266, 1313-1337. Peer Reviewed verified by ORBi |
Menet, Q. (01 December 2018). Invariant subspaces for non-normable Fréchet spaces. Advances in Mathematics, 339, 495-539. Peer Reviewed verified by ORBi |
Menet, Q. (05 January 2018). Existence of common hypercyclic subspaces for the derivative operator and the translation operators. Revista de la Real Academia de Ciencias Exactas, Fisicas y Naturales. Serie A Matemáticas, 113 (2), 487-505. Peer reviewed |
Menet, Q. (13 February 2017). Linear chaos and frequent hypercyclicity. Transactions of the American Mathematical Society, 369, 4977-4994. Peer Reviewed verified by ORBi |
Menet, Q., Peris, A., Bès, J., & Puig, Y. (01 October 2016). Recurrence properties of hypercyclic operators. Mathematische Annalen, 366, 545-572. Peer Reviewed verified by ORBi |
Menet, Q., Bayart, F., & Ernst, R. (01 July 2016). Non-existence of frequently hypercyclic subspaces for P(D). Israel Journal of Mathematics, 214, 149-166. Peer Reviewed verified by ORBi |
Menet, Q., Ernst, R., & Charpentier, S. (15 June 2016). Gamma-supercyclicity. Journal of Functional Analysis, 270, 4443-4465. Peer Reviewed verified by ORBi |
Bouyer-Decitre, P., Brihaye, T., Carlier, P., & Menet, Q. (2016). Composition of stochastic timed automata. Lecture Notes in Computer Science. Peer reviewed |
Brihaye, T., Haddad, A., & Menet, Q. (2015). Simple strategies for Banach-Mazur games and sets of probability 1. Information and Computation. Peer Reviewed verified by ORBi |
Menet, Q., & Bès, J. (01 December 2015). Existence of common and upper frequently hypercyclic subspaces. Journal of Mathematical Analysis and Applications, 432, 10-37. Peer Reviewed verified by ORBi |
Menet, Q. (06 June 2015). Existence and non-existence of frequently hypercyclic subspaces for weighted shifts. Proceedings of the American Mathematical Society, 143 (6), 2469-2477. Peer Reviewed verified by ORBi |
Menet, Q. (28 May 2015). Hereditarily hypercyclic subspaces. Journal of Operator Theory, 73 (2), 385-405. Peer Reviewed verified by ORBi |
Bertrand, N., Bouyer, P., Brihaye, T., Menet, Q., Baier, C., Groesser, M., & Jurdzinski, M. (2014). Stochastic Timed Automata. Logical Methods in Computer Science. Peer reviewed |
Charpentier, S., Menet, Q., & Mouze, A. (01 December 2014). Closed universal subspaces of spaces of infinitely differentiable functions. Annales de l'Institut Fourier, 64 (N° spécial), 297-325. Peer reviewed |
Menet, Q. (01 April 2014). Hypercyclic subspaces and weighted shifts. Advances in Mathematics, 255, 305-337. Peer Reviewed verified by ORBi |
Menet, Q. (01 December 2013). Hypercyclic Subspaces on Fréchet Spaces Without Continuous Norm. Integral Equations and Operator Theory, 77 (4), 489-520. Peer Reviewed verified by ORBi |
Bouyer, P., Brihaye, T., Jurdzinski, M., & Menet, Q. (04 December 2012). Almost-Sure Model-Checking of Reactive Timed Automata. Proceedings IEEE Computer Society Bioinformatics Conference, QEST 2012, 138-147. Peer Reviewed verified by ORBi |
Menet, Q. (20 December 2011). Sous-espaces fermés de séries universelles sur un espace de Fréchet. Studia Mathematica, 207 (2), 181-195. Peer Reviewed verified by ORBi |
  | Equeter, L., Cools, A., Cultrera, L., Dupont, N., Fays, V., Giancola, K., Gillet, M., Glineur, C., Heyman, M., Invernizzi, S., Lucassen, L., Main, J., Mégret, A., Menet, Q., Mincheva, R., Pirson, F., Sobczak, F., Thiebault, F., Vachaudez, A., ... Vitry, V. (2024). Abstract book du Mardi des Chercheurs 2024. Abstract book du Mardi des Chercheurs. |
Bouyer, P., Brihaye, T., Carlier, P., & Menet, Q. (2016). Compositional Design of Stochastic Timed Automata [Paper presentation]. Computer Science Symposium in Russia, Saint-Pétersbourg, Russia. |
Brihaye, T., & Menet, Q. (2013). Simple strategies for Banach-Mazur games and fairly correct systems [Paper presentation]. International Symposium on Games, Automata, Logics and Formal Verification, Borca di Cadore, Italy. |
