Abstract
The goal of this paper is to characterize function distributions that deep
learning can or cannot learn in poly-time. A universality result is proved for
SGD-based deep learning and a non-universality result is proved for GD-based
deep learning; this also gives a separation between SGD-based deep learning and
statistical query algorithms:
(1) Deep learning with SGD is efficiently universal. Any function
distribution that can be learned from samples in poly-time can also be learned
by a poly-size neural net trained with SGD on a poly-time initialization with
poly-steps, poly-rate and possibly poly-noise.
Therefore deep learning provides a universal learning paradigm: it was known
that the approximation and estimation errors could be controlled with poly-size
neural nets, using ERM that is NP-hard; this new result shows that the
optimization error can also be controlled with SGD in poly-time. The picture
changes for GD with large enough batches:
(2) Result (1) does not hold for GD: Neural nets of poly-size trained
with GD (full gradients or large enough batches) on any initialization with
poly-steps, poly-range and at least poly-noise cannot learn any function
distribution that has super-polynomial cross-predictability, where the
cross-predictability gives a measure of ``average'' function correlation --
relations and distinctions to the statistical dimension are discussed. In
particular, GD with these constraints can learn efficiently monomials of degree
$k$ if and only if $k$ is constant.
Thus (1) and (2) point to an interesting contrast: SGD is universal even with
some poly-noise while full GD or SQ algorithms are not (e.g., parities).
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