Paper Info
Title
Deep Learning by Scattering.
Abstract
We introduce general scattering transforms as mathematical models of deep neural networks with l2 pooling. Scattering networks iteratively apply complex valued unitary operators, and the pooling is performed by a complex modulus. An expected scattering defines a contractive representation of a high-dimensional probability distribution, which preserves its mean-square norm. We show that unsupervised learning can be casted as an optimization of the space contraction to preserve the volume occupied by unlabeled examples, at each layer of the network. Supervised learning and classification are performed with an averaged scattering, which provides scattering estimations for multiple classes.
Year
Venue
Field
2013
CoRR
Mathematical optimization,Pooling,Supervised learning,Probability distribution,Unsupervised learning,Operator (computer programming),Artificial intelligence,Scattering,Deep learning,Mathematical model,Machine learning,Mathematics
DocType
Volume
Citations 
Journal
abs/1306.5532
2
PageRank 
References 
Authors
0.37
4
2
Name
Order
Citations
PageRank
Stéphane Mallat14107718.30
irene waldspurger2654.71