We introduce the "continuized" Nesterov acceleration, a close variant of Nesterov acceleration whose variables are indexed by a continuous time parameter. The two variables continuously mix following a linear ordinary differential equation and take gradient steps at random times. This continuized variant benefits from the best of the continuous and the discrete frameworks: as a continuous process, one can use differential calculus to analyze convergence and obtain analytical expressions for the parameters; but a discretization of the continuized process can be computed exactly with convergence rates similar to those of Nesterov original acceleration. We show that the discretization has the same structure as Nesterov acceleration, but with r...
We investigate convex differentiable optimization and explore the temporal discretization of damped ...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
We study accelerated mirror descent dynamics in continuous and discrete time. Combining the original...
International audienceWe introduce the "continuized" Nesterov acceleration, a close variant of Neste...
In this article a family of second order ODEs associated to inertial gradient descend is studied. Th...
We derive a second-order ordinary differential equation (ODE), which is the limit of Nesterov’s acce...
Accelerated gradient methods play a central role in optimization, achieving optimal rates in many se...
In this paper, we study the behavior of solutions of the ODE associated to Nesterov acceleration. It...
International audienceThe continuous-time model of Nesterov’s momentum provides a thought-provoking ...
(Based on a joint work with Z. Chbani and H. Riahi) In a Hilbert space setting $\mathcal{H}$, given...
We formulate gradient-based Markov chain Monte Carlo (MCMC) sampling as optimization on the space of...
International audienceWe revisit the Ravine method of Gelfand and Tsetlin from a dynamical system pe...
International audienceThe forward-backward algorithm is a powerful tool for solving optimization pro...
International audienceIn this article a family of second order ODEs associated to inertial gradient ...
This Thesis focuses on the study of inertial methods for solving composite convex minimization probl...
We investigate convex differentiable optimization and explore the temporal discretization of damped ...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
We study accelerated mirror descent dynamics in continuous and discrete time. Combining the original...
International audienceWe introduce the "continuized" Nesterov acceleration, a close variant of Neste...
In this article a family of second order ODEs associated to inertial gradient descend is studied. Th...
We derive a second-order ordinary differential equation (ODE), which is the limit of Nesterov’s acce...
Accelerated gradient methods play a central role in optimization, achieving optimal rates in many se...
In this paper, we study the behavior of solutions of the ODE associated to Nesterov acceleration. It...
International audienceThe continuous-time model of Nesterov’s momentum provides a thought-provoking ...
(Based on a joint work with Z. Chbani and H. Riahi) In a Hilbert space setting $\mathcal{H}$, given...
We formulate gradient-based Markov chain Monte Carlo (MCMC) sampling as optimization on the space of...
International audienceWe revisit the Ravine method of Gelfand and Tsetlin from a dynamical system pe...
International audienceThe forward-backward algorithm is a powerful tool for solving optimization pro...
International audienceIn this article a family of second order ODEs associated to inertial gradient ...
This Thesis focuses on the study of inertial methods for solving composite convex minimization probl...
We investigate convex differentiable optimization and explore the temporal discretization of damped ...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
We study accelerated mirror descent dynamics in continuous and discrete time. Combining the original...