Add to ORKGThe Frank-Wolfe algorithm is a popular method for minimizing a smooth convex function f over a compact convex set C. While many convergence results have been derived in terms of function values, hardly nothing is known about the convergence behavior of the sequence of iterates (xt)t2N. Under the usual assumptions, we design several counterexamples to the convergence of (xt)t2N, where f is d-time continuously differentiable, d > 2, and f(xt) ---> minC f. Our counterexamples cover the cases of open-loop, closed-loop, and line-search step-size strategies. We do not assume misspecification of the linear minimization oracle and our results thus hold regardless of the points it returns, demonstrating the fundamental pathologies in the convergenc...
The classical Frank and Wolfe theorem states that a quadratic function which is bounded below on a c...
In this paper, we establish global convergence results for projection and relaxation algorithms for ...
In this note we discuss the convergence of Newton`s method for minimization. We present examples in ...
The Frank-Wolfe algorithm is a popular method for minimizing a smooth convex function $f$ over a com...
International audienceThe Frank-Wolfe (FW) optimization algorithm has lately re-gained popularity th...
We study the linear convergence of variants of the Frank-Wolfe algorithms for some classes of strong...
6 pagesWe give a simple proof that the Frank-Wolfe algorithm obtains a stationary point at a rate of...
We revisit the Frank-Wolfe (FW) optimization under strongly convex constraint sets. We provide a fas...
The Frank-Wolfe method (a.k.a. conditional gradient algorithm) for smooth optimization has regained ...
We propose a rank-k variant of the classical Frank-Wolfe algorithm to solve convex optimization over...
International audienceConditional Gradients (aka Frank-Wolfe algorithms) form a classical set of met...
The Frank-Wolfe (FW) method, which implements efficient linear oracles that minimize linear approxim...
International audienceWe extend the Frank-Wolfe (FW) optimization algorithm to solve constrained smo...
FISTA est un algorithme classique d'optimisation des fonctions convexes. Cet article propose de nouv...
Aiming at convex optimization under structural constraints, this work introduces and analyzes a vari...
The classical Frank and Wolfe theorem states that a quadratic function which is bounded below on a c...
In this paper, we establish global convergence results for projection and relaxation algorithms for ...
In this note we discuss the convergence of Newton`s method for minimization. We present examples in ...
The Frank-Wolfe algorithm is a popular method for minimizing a smooth convex function $f$ over a com...
International audienceThe Frank-Wolfe (FW) optimization algorithm has lately re-gained popularity th...
We study the linear convergence of variants of the Frank-Wolfe algorithms for some classes of strong...
6 pagesWe give a simple proof that the Frank-Wolfe algorithm obtains a stationary point at a rate of...
We revisit the Frank-Wolfe (FW) optimization under strongly convex constraint sets. We provide a fas...
The Frank-Wolfe method (a.k.a. conditional gradient algorithm) for smooth optimization has regained ...
We propose a rank-k variant of the classical Frank-Wolfe algorithm to solve convex optimization over...
International audienceConditional Gradients (aka Frank-Wolfe algorithms) form a classical set of met...
The Frank-Wolfe (FW) method, which implements efficient linear oracles that minimize linear approxim...
International audienceWe extend the Frank-Wolfe (FW) optimization algorithm to solve constrained smo...
FISTA est un algorithme classique d'optimisation des fonctions convexes. Cet article propose de nouv...
Aiming at convex optimization under structural constraints, this work introduces and analyzes a vari...
The classical Frank and Wolfe theorem states that a quadratic function which is bounded below on a c...
In this paper, we establish global convergence results for projection and relaxation algorithms for ...
In this note we discuss the convergence of Newton`s method for minimization. We present examples in ...