Curriculum vitae

de Tilière Béatrice

Full Professor
CEREMADE

detiliereping@ceremade.dauphinepong.fr
Personal URL

Biography

Béatrice de Tilière is Professor of Mathematics at University Paris-Dauphine. After an Engineering diploma in Mathematics from the Swiss Federal Institute of Technology (Lausanne), and one year of graduate courses at UC Berkeley, she obtained her PhD from Orsay University (Paris-Saclay). Her research lies in statistical mechanics, more specifically she works on the dimer and related models. She was a junior member of "Institut Universitaire de France" (2017-2022), and in 2020 she took the responsability of Dauphine's Mathematics Doctoral Program.

Latest publications

Articles

Boutillier C., Cimasoni D., de Tilière B. (2023), Minimal bipartite dimers and higher genus Harnack curves, Probability and Mathematical Physics, vol. 4, n°1, p. 151-208

Boutillier C., Cimasoni D., de Tilière B. (2022), Isoradial immersions, Journal of Graph Theory, vol. 99, n°4, p. 715-757

Boutillier C., de Tilière B., Raschel K. (2019), The Z-invariant Ising model via dimers, Probability Theory and Related Fields, vol. 174, n°1-2, p. 235-305

Boutillier C., de Tilière B., Raschel K. (2017), The Z-invariant massive Laplacian on isoradial graphs, Inventiones Mathematicae, vol. 208, n°1, p. 109-189

de Tilière B. (2016), Bipartite dimer representation of squares of 2d-Ising correlations, Annales de l’Institut Henri Poincaré D, vol. 3, n°2, p. 121-138

de Tilière B. (2016), Critical Ising model and spanning trees partition functions, Annales Henri Poincaré, vol. 52, n°3, p. 1382-1405

de Tilière B. (2014), Principal minors Pfaffian half-tree theorem, Journal of Combinatorial Theory, Series A, vol. 124, n°May 2014, p. 1-40

Boutillier C., de Tilière B. (2014), Height representation of XOR-Ising loops via bipartite dimers, Electronic Journal of Probability, vol. 19, p. 1-33

de Tilière B. (2013), From Cycle Rooted Spanning Forests to the Critical Ising Model: an Explicit Construction, Communications in Mathematical Physics, vol. 319, n°1, p. 69-110

Boutillier C., de Tilière B. (2011), The Critical Z-Invariant Ising Model via Dimers: Locality Property, Communications in Mathematical Physics, vol. 301, n°2, p. 473-516

Boutillier C., de Tilière B. (2010), The critical Z-invariant Ising model via dimers: the periodic case, Probability Theory and Related Fields, vol. 147, n°3-4, p. 379-413

Boutillier C., de Tilière B. (2009), Loops statistics in the toroidal honeycomb dimer model, Annals of Probability, vol. 37, n°5, p. 1747-1777

Bolthausen E., Caravenna F., de Tilière B. (2009), The quenched critical point of a diluted disordered polymer model, Stochastic Processes and their Applications, vol. 119, n°5, p. 1479-1504

de Tilière B. (2007), Scaling limit of isoradial dimer models and the case of triangular quadri-tilings, Annales Henri Poincaré, vol. 43, n°6, p. 729-750

de Tilière B. (2007), Quadri-tilings of the Plane, Probability Theory and Related Fields, vol. 137, n°3-4, p. 487-518

de Tilière B. (2007), Partition function of periodic isoradial dimer models, Probability Theory and Related Fields, vol. 138, n°3-4, p. 451-462

Ouvrages

Boutillier C., de Tilière B., Raschel K. (2023), Topics in statistical mechanics, Paris: Société mathématique de France, XXII-230 p.

Chapitres d'ouvrage

Boutillier C., de Tilière B. (2012), Statistical Mechanics on Isoradial Graphs, in Jean-Dominique Deuschel, Barbara Gentz, Wolfgang König, Max von Renesse, Michael Scheutzow, Uwe Schmock, Probability in Complex Physical Systems Springer, p. 512

Prépublications / Cahiers de recherche

Affolter N., de Tilière B., Melotti P. (2022), The Schwarzian octahedron recurrence (dSKP equation) I : explicit solutions, Paris, Cahier de recherche CEREMADE, Université Paris Dauphine-PSL, 48 p.

Boutillier C., Cimasoni D., de Tilière B. (2022), Elliptic dimers on minimal graphs and genus 1 Harnack curves, Paris, Cahier de recherche CEREMADE, Université Paris Dauphine-PSL, 77 p.

Affolter N., de Tilière B., Melotti P. (2022), The Schwarzian octahedron recurrence (dSKP equation) II: geometric systems, Paris, Cahier de recherche CEREMADE, Université Paris Dauphine-PSL, 45 p.

Back to the list