25,036 research outputs found
A jamming transition from under- to over-parametrization affects loss landscape and generalization
We argue that in fully-connected networks a phase transition delimits the
over- and under-parametrized regimes where fitting can or cannot be achieved.
Under some general conditions, we show that this transition is sharp for the
hinge loss. In the whole over-parametrized regime, poor minima of the loss are
not encountered during training since the number of constraints to satisfy is
too small to hamper minimization. Our findings support a link between this
transition and the generalization properties of the network: as we increase the
number of parameters of a given model, starting from an under-parametrized
network, we observe that the generalization error displays three phases: (i)
initial decay, (ii) increase until the transition point --- where it displays a
cusp --- and (iii) slow decay toward a constant for the rest of the
over-parametrized regime. Thereby we identify the region where the classical
phenomenon of over-fitting takes place, and the region where the model keeps
improving, in line with previous empirical observations for modern neural
networks.Comment: arXiv admin note: text overlap with arXiv:1809.0934
Approximate Computation and Implicit Regularization for Very Large-scale Data Analysis
Database theory and database practice are typically the domain of computer
scientists who adopt what may be termed an algorithmic perspective on their
data. This perspective is very different than the more statistical perspective
adopted by statisticians, scientific computers, machine learners, and other who
work on what may be broadly termed statistical data analysis. In this article,
I will address fundamental aspects of this algorithmic-statistical disconnect,
with an eye to bridging the gap between these two very different approaches. A
concept that lies at the heart of this disconnect is that of statistical
regularization, a notion that has to do with how robust is the output of an
algorithm to the noise properties of the input data. Although it is nearly
completely absent from computer science, which historically has taken the input
data as given and modeled algorithms discretely, regularization in one form or
another is central to nearly every application domain that applies algorithms
to noisy data. By using several case studies, I will illustrate, both
theoretically and empirically, the nonobvious fact that approximate
computation, in and of itself, can implicitly lead to statistical
regularization. This and other recent work suggests that, by exploiting in a
more principled way the statistical properties implicit in worst-case
algorithms, one can in many cases satisfy the bicriteria of having algorithms
that are scalable to very large-scale databases and that also have good
inferential or predictive properties.Comment: To appear in the Proceedings of the 2012 ACM Symposium on Principles
of Database Systems (PODS 2012
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