On the Modeling of Error Functions as High Dimensional Landscapes for Weight Initialization in Learning Networks

July 20, 2016 ยท Declared Dead ยท ๐Ÿ› International Conference / Workshop on Embedded Computer Systems: Architectures, Modeling and Simulation

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Authors Julius, Gopinath Mahale, Sumana T., C. S. Adityakrishna arXiv ID 1607.06011 Category cs.LG: Machine Learning Cross-listed cs.CV, physics.data-an, stat.ML Citations 1 Venue International Conference / Workshop on Embedded Computer Systems: Architectures, Modeling and Simulation Last Checked 4 months ago
Abstract
Next generation deep neural networks for classification hosted on embedded platforms will rely on fast, efficient, and accurate learning algorithms. Initialization of weights in learning networks has a great impact on the classification accuracy. In this paper we focus on deriving good initial weights by modeling the error function of a deep neural network as a high-dimensional landscape. We observe that due to the inherent complexity in its algebraic structure, such an error function may conform to general results of the statistics of large systems. To this end we apply some results from Random Matrix Theory to analyse these functions. We model the error function in terms of a Hamiltonian in N-dimensions and derive some theoretical results about its general behavior. These results are further used to make better initial guesses of weights for the learning algorithm.
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