International audienceAn algorithmically hard phase was described in a range of inference problems: even if the signal can be reconstructed with a small error from an information theoretic point of view, known algorithms fail unless the noise-to-signal ratio is sufficiently small. This $hard\ phase$ is typically understood as a metastable branch of the dynamical evolution of message passing algorithms. In this work we study the metastable branch for a prototypical inference problem, the low-rank matrix factorization, that presents a hard phase. We show that for noise-to-signal ratios that are below the information theoretic threshold, the posterior measure is composed of an exponential number of metastable glassy states and we compute their...
Inference algorithms based on evolving interactions between replicated solutions are introduced and ...
International audienceWe study the problem of detecting a structured, lowrank signal matrix corrupte...
We review recent works (Sarao Mannelli et al 2018 arXiv:1812.09066, 2019 Int. Conf. on Machine Learn...
International audienceAn algorithmically hard phase was described in a range of inference problems: ...
An algorithmically hard phase is described in a range of inference problems: Even if the signal can ...
In this review article we discuss connections between the physics of disordered systems, phase trans...
What makes an algorithmic problem easy or hard? Many general algorithmic techniques arising from de...
Many inference problems undergo phase transitions as a function of the signal-to-noise ratio, a prom...
Abstract—We consider dictionary learning and blind calibra-tion for signals and matrices created fro...
International audienceGradient-descent-based algorithms and their stochastic versions have widesprea...
MISTEAInternational audienceWe study the problem of detecting a structured, low-rank signal matrix c...
International audienceApproximate message passing algorithm enjoyed considerable attention in the la...
5 pagesInternational audienceWe consider dictionary learning and blind calibration for signals and m...
Gradient-descent-based algorithms and their stochastic versions have widespread applications in mach...
The planted coloring problem is a prototypical inference problem for which thresholds for Bayes opti...
Inference algorithms based on evolving interactions between replicated solutions are introduced and ...
International audienceWe study the problem of detecting a structured, lowrank signal matrix corrupte...
We review recent works (Sarao Mannelli et al 2018 arXiv:1812.09066, 2019 Int. Conf. on Machine Learn...
International audienceAn algorithmically hard phase was described in a range of inference problems: ...
An algorithmically hard phase is described in a range of inference problems: Even if the signal can ...
In this review article we discuss connections between the physics of disordered systems, phase trans...
What makes an algorithmic problem easy or hard? Many general algorithmic techniques arising from de...
Many inference problems undergo phase transitions as a function of the signal-to-noise ratio, a prom...
Abstract—We consider dictionary learning and blind calibra-tion for signals and matrices created fro...
International audienceGradient-descent-based algorithms and their stochastic versions have widesprea...
MISTEAInternational audienceWe study the problem of detecting a structured, low-rank signal matrix c...
International audienceApproximate message passing algorithm enjoyed considerable attention in the la...
5 pagesInternational audienceWe consider dictionary learning and blind calibration for signals and m...
Gradient-descent-based algorithms and their stochastic versions have widespread applications in mach...
The planted coloring problem is a prototypical inference problem for which thresholds for Bayes opti...
Inference algorithms based on evolving interactions between replicated solutions are introduced and ...
International audienceWe study the problem of detecting a structured, lowrank signal matrix corrupte...
We review recent works (Sarao Mannelli et al 2018 arXiv:1812.09066, 2019 Int. Conf. on Machine Learn...