2 research outputs found
Scaling-up Empirical Risk Minimization: Optimization of Incomplete U-statistics
In a wide range of statistical learning problems such as ranking, clustering
or metric learning among others, the risk is accurately estimated by
-statistics of degree , i.e. functionals of the training data with
low variance that take the form of averages over -tuples. From a
computational perspective, the calculation of such statistics is highly
expensive even for a moderate sample size , as it requires averaging
terms. This makes learning procedures relying on the optimization of
such data functionals hardly feasible in practice. It is the major goal of this
paper to show that, strikingly, such empirical risks can be replaced by
drastically computationally simpler Monte-Carlo estimates based on terms
only, usually referred to as incomplete -statistics, without damaging the
learning rate of Empirical Risk Minimization (ERM)
procedures. For this purpose, we establish uniform deviation results describing
the error made when approximating a -process by its incomplete version under
appropriate complexity assumptions. Extensions to model selection, fast rate
situations and various sampling techniques are also considered, as well as an
application to stochastic gradient descent for ERM. Finally, numerical examples
are displayed in order to provide strong empirical evidence that the approach
we promote largely surpasses more naive subsampling techniques.Comment: To appear in Journal of Machine Learning Research. 34 pages. v2:
minor correction to Theorem 4 and its proof, added 1 reference. v3: typo
corrected in Proposition 3. v4: improved presentation, added experiments on
model selection for clustering, fixed minor typo
On-Line Learning Gossip Algorithm in Multi-Agent Systems with Local Decision Rules
IEEE International Conference on BigData 201