Despite the broad use of fixed-point iterations throughout applied mathematics, the optimal convergence rate of general fixed-point problems with nonexpansive nonlinear operators has not been established. This work presents an acceleration mechanism for fixed-point iterations with nonexpansive operators, contractive operators, and nonexpansive operators satisfying a H\"older-type growth condition. We then provide matching complexity lower bounds to establish the exact optimality of the acceleration mechanisms in the nonexpansive and contractive setups. Finally, we provide experiments with CT imaging, optimal transport, and decentralized optimization to demonstrate the practical effectiveness of the acceleration mechanism.Comment: ICML 2022 ...
Banach's fixed point theorem for contraction maps has been widely used to analyze the convergence of...
International audienceWe describe a convergence acceleration scheme for multistep optimization algor...
Using the implicit iteration and the hybrid method in mathematical programming, we prove weak and st...
International audienceFixed point iterations are still the most common approach to dealing with a v...
The extrapolation method known as Anderson acceleration has been used for decades to speed the conve...
In many iterative optimization methods, fixed-point theory enables the analysis of the convergence r...
AbstractLet (xn) be some sequence generated by xn+1 = ƒ(xn) where ƒ(x)=(x) + ∑i ⩾ 1α p+1xp+i, p ⩾ 1,...
We propose a unified framework to analyze fixed point iterations of a set-valued operator that is th...
The paper discusses iterative methods for linear systems and various ways to accelerate their conver...
This is a companion paper to "Ghost penalties in nonconvex constrained optimization: Diminishing ste...
Several new accelerated methods in minimax optimization and fixed-point iterations have recently bee...
International audienceFixed point iterations are still the most common approach to dealing with a va...
summary:Consider the Mann iteration $x_{n+1} = ( 1 - \alpha_n ) x_n + \alpha_n Tx_n$ for a nonexpans...
summary:On étend à des équations non linéaires de point fixe des méthodes d'itérations chaotiques ét...
The paper investigates two inertial extragradient algorithms for seeking a common solution to a vari...
Banach's fixed point theorem for contraction maps has been widely used to analyze the convergence of...
International audienceWe describe a convergence acceleration scheme for multistep optimization algor...
Using the implicit iteration and the hybrid method in mathematical programming, we prove weak and st...
International audienceFixed point iterations are still the most common approach to dealing with a v...
The extrapolation method known as Anderson acceleration has been used for decades to speed the conve...
In many iterative optimization methods, fixed-point theory enables the analysis of the convergence r...
AbstractLet (xn) be some sequence generated by xn+1 = ƒ(xn) where ƒ(x)=(x) + ∑i ⩾ 1α p+1xp+i, p ⩾ 1,...
We propose a unified framework to analyze fixed point iterations of a set-valued operator that is th...
The paper discusses iterative methods for linear systems and various ways to accelerate their conver...
This is a companion paper to "Ghost penalties in nonconvex constrained optimization: Diminishing ste...
Several new accelerated methods in minimax optimization and fixed-point iterations have recently bee...
International audienceFixed point iterations are still the most common approach to dealing with a va...
summary:Consider the Mann iteration $x_{n+1} = ( 1 - \alpha_n ) x_n + \alpha_n Tx_n$ for a nonexpans...
summary:On étend à des équations non linéaires de point fixe des méthodes d'itérations chaotiques ét...
The paper investigates two inertial extragradient algorithms for seeking a common solution to a vari...
Banach's fixed point theorem for contraction maps has been widely used to analyze the convergence of...
International audienceWe describe a convergence acceleration scheme for multistep optimization algor...
Using the implicit iteration and the hybrid method in mathematical programming, we prove weak and st...