1 research outputs found
Jeffrey's prior sampling of deep sigmoidal networks
Neural networks have been shown to have a remarkable ability to uncover low
dimensional structure in data: the space of possible reconstructed images form
a reduced model manifold in image space. We explore this idea directly by
analyzing the manifold learned by Deep Belief Networks and Stacked Denoising
Autoencoders using Monte Carlo sampling. The model manifold forms an only
slightly elongated hyperball with actual reconstructed data appearing
predominantly on the boundaries of the manifold. In connection with the results
we present, we discuss problems of sampling high-dimensional manifolds as well
as recent work [M. Transtrum, G. Hart, and P. Qiu, Submitted (2014)] discussing
the relation between high dimensional geometry and model reduction