269 research outputs found
Variance Reduction for Faster Non-Convex Optimization
We consider the fundamental problem in non-convex optimization of efficiently
reaching a stationary point. In contrast to the convex case, in the long
history of this basic problem, the only known theoretical results on
first-order non-convex optimization remain to be full gradient descent that
converges in iterations for smooth objectives, and
stochastic gradient descent that converges in iterations
for objectives that are sum of smooth functions.
We provide the first improvement in this line of research. Our result is
based on the variance reduction trick recently introduced to convex
optimization, as well as a brand new analysis of variance reduction that is
suitable for non-convex optimization. For objectives that are sum of smooth
functions, our first-order minibatch stochastic method converges with an
rate, and is faster than full gradient descent by
.
We demonstrate the effectiveness of our methods on empirical risk
minimizations with non-convex loss functions and training neural nets.Comment: polished writin
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