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Bertrand Delamotte

Showing results (11-20 of 21) with videos related to

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Physical Review Letters|May 21, 2010
Nonperturbative renormalization group for the Kardar-Parisi-Zhang equationLéonie Canet, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review Letters|June 1, 2004
Nonperturbative renormalization-group study of reaction-diffusion processesLéonie Canet, Bertrand Delamotte, Olivier Deloubrière, et al.
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics|October 30, 2014
Kardar-Parisi-Zhang equation with spatially correlated noise: a unified picture from nonperturbative renormalization groupThomas Kloss, Léonie Canet, Bertrand Delamotte, et al.
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics|March 4, 2014
Finite-scale singularity in the renormalization group flow of a reaction-diffusion systemDamien Gredat, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review. E|April 18, 2025
O(N)×O(2) scalar models: Including O(∂^{2}) corrections in the functional renormalization group analysisCarlos A Sánchez-Villalobos, Bertrand Delamotte, Nicolás Wschebor
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics|February 7, 2012
Nonperturbative renormalization group for the Kardar-Parisi-Zhang equation: general framework and first applicationsLéonie Canet, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review. E|January 20, 2024
q-state Potts model from the nonperturbative renormalization groupCarlos A Sánchez-Villalobos, Bertrand Delamotte, Nicolás Wschebor
Physical Review. E|July 18, 2024
Conformal invariance and composite operators: A strategy for improving the derivative expansion of the nonperturbative renormalization groupBertrand Delamotte, Gonzalo De Polsi, Matthieu Tissier, et al.
Physical Review Letters|January 11, 2020
Convergence of Nonperturbative Approximations to the Renormalization GroupIvan Balog, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review Letters|October 4, 2005
Nonperturbative fixed point in a nonequilibrium phase transitionLéonie Canet, Hugues Chaté, Bertrand Delamotte, et al.
Pageof 3

Showing results (11-20 of 21) with videos related to

Sort By:
Pageof 3
Physical Review Letters|May 21, 2010
Nonperturbative renormalization group for the Kardar-Parisi-Zhang equationLéonie Canet, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review Letters|June 1, 2004
Nonperturbative renormalization-group study of reaction-diffusion processesLéonie Canet, Bertrand Delamotte, Olivier Deloubrière, et al.
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics|October 30, 2014
Kardar-Parisi-Zhang equation with spatially correlated noise: a unified picture from nonperturbative renormalization groupThomas Kloss, Léonie Canet, Bertrand Delamotte, et al.
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics|March 4, 2014
Finite-scale singularity in the renormalization group flow of a reaction-diffusion systemDamien Gredat, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review. E|April 18, 2025
O(N)×O(2) scalar models: Including O(∂^{2}) corrections in the functional renormalization group analysisCarlos A Sánchez-Villalobos, Bertrand Delamotte, Nicolás Wschebor
Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics|February 7, 2012
Nonperturbative renormalization group for the Kardar-Parisi-Zhang equation: general framework and first applicationsLéonie Canet, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review. E|January 20, 2024
q-state Potts model from the nonperturbative renormalization groupCarlos A Sánchez-Villalobos, Bertrand Delamotte, Nicolás Wschebor
Physical Review. E|July 18, 2024
Conformal invariance and composite operators: A strategy for improving the derivative expansion of the nonperturbative renormalization groupBertrand Delamotte, Gonzalo De Polsi, Matthieu Tissier, et al.
Physical Review Letters|January 11, 2020
Convergence of Nonperturbative Approximations to the Renormalization GroupIvan Balog, Hugues Chaté, Bertrand Delamotte, et al.
Physical Review Letters|October 4, 2005
Nonperturbative fixed point in a nonequilibrium phase transitionLéonie Canet, Hugues Chaté, Bertrand Delamotte, et al.
Pageof 3