Iterative stochastic approximation methods are widely used to solve M-estimation problems, in the context of predictive learning in particular. In certain situations that shall be undoubtedly more and more common in the Big Data era, the datasets available are so massive that computing statistics over the full sample is hardly feasible, if not unfeasible. A natural and popular approach to gradient descent in this context consists in substituting the “full data” statistics with their counterparts based on subsamples picked at random of manageable size. It is the main purpose of this paper to investigate the impact of survey sampling with unequal inclusion probabilities on stochastic gradient descent-based M-estimation methods. Precisely, we ...
In this paper, we study a stochastic strongly convex optimization problem and propose three classes ...
In sample surveys, estimates are often required for small subclasses of the population under study. ...
This thesis presents some broadly applicable algorithms for computing maximum likelihood estimates (...
Iterative stochastic approximation methods are widely used to solve M-estimation problems, in the co...
We address the practical construction of asymptotic confidence intervals for smooth (i.e., path-wise...
International audienceIn many learning problems, ranging from clustering to ranking through metric l...
In many learning problems, ranging from clustering to ranking through metric learning, empirical est...
We are concerned with the efficiency of stochastic gradient estimation methods for large-scale nonli...
We present a novel method for frequentist statistical inference in M-estimation problems, based on s...
Many strategies in survey sampling depend on large sample approximation formulae for design-based in...
Statistical inference, such as hypothesis testing and calculating a confidence interval, is an impor...
Efficient optimization procedures, such as stochastic gradient descent, have been gaining popularity...
Stochastic programming combines ideas from deterministic optimization with probability and statistic...
Variational inference approximates the posterior distribution of a probabilistic model with a parame...
The objective function of a stochastic optimization problem usually involves an expectation of rando...
In this paper, we study a stochastic strongly convex optimization problem and propose three classes ...
In sample surveys, estimates are often required for small subclasses of the population under study. ...
This thesis presents some broadly applicable algorithms for computing maximum likelihood estimates (...
Iterative stochastic approximation methods are widely used to solve M-estimation problems, in the co...
We address the practical construction of asymptotic confidence intervals for smooth (i.e., path-wise...
International audienceIn many learning problems, ranging from clustering to ranking through metric l...
In many learning problems, ranging from clustering to ranking through metric learning, empirical est...
We are concerned with the efficiency of stochastic gradient estimation methods for large-scale nonli...
We present a novel method for frequentist statistical inference in M-estimation problems, based on s...
Many strategies in survey sampling depend on large sample approximation formulae for design-based in...
Statistical inference, such as hypothesis testing and calculating a confidence interval, is an impor...
Efficient optimization procedures, such as stochastic gradient descent, have been gaining popularity...
Stochastic programming combines ideas from deterministic optimization with probability and statistic...
Variational inference approximates the posterior distribution of a probabilistic model with a parame...
The objective function of a stochastic optimization problem usually involves an expectation of rando...
In this paper, we study a stochastic strongly convex optimization problem and propose three classes ...
In sample surveys, estimates are often required for small subclasses of the population under study. ...
This thesis presents some broadly applicable algorithms for computing maximum likelihood estimates (...