Contemporary Mathematics
Lipschitz properties for deep convolutional networks
Publication
, Chapter
Balan, R; Singh, M; Zou, D
January 1, 2018
In this paper we discuss the stability properties of convolutional neural networks. Convolutional neural networks are widely used in machine learning. In classification they are mainly used as feature extractors. Ideally, we expect similar features when the inputs are from the same class. That is, we hope to see a small change in the feature vector with respect to a deformation on the input signal. This can be established mathematically, and the key step is to derive the Lipschitz properties. Further, we establish that the stability results can be extended for more general networks. We give a formula for computing the Lipschitz bound, and compare it with other methods to show it is closer to the optimal value.
Duke Scholars
DOI
Publication Date
January 1, 2018
Volume
706
Start / End Page
129 / 151
Related Subject Headings
- 4904 Pure mathematics
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Balan, R., Singh, M., & Zou, D. (2018). Lipschitz properties for deep convolutional networks. In Contemporary Mathematics (Vol. 706, pp. 129–151). https://doi.org/10.1090/conm/706/14205
Balan, R., M. Singh, and D. Zou. “Lipschitz properties for deep convolutional networks.” In Contemporary Mathematics, 706:129–51, 2018. https://doi.org/10.1090/conm/706/14205.
Balan R, Singh M, Zou D. Lipschitz properties for deep convolutional networks. In: Contemporary Mathematics. 2018. p. 129–51.
Balan, R., et al. “Lipschitz properties for deep convolutional networks.” Contemporary Mathematics, vol. 706, 2018, pp. 129–51. Scopus, doi:10.1090/conm/706/14205.
Balan R, Singh M, Zou D. Lipschitz properties for deep convolutional networks. Contemporary Mathematics. 2018. p. 129–151.
DOI
Publication Date
January 1, 2018
Volume
706
Start / End Page
129 / 151
Related Subject Headings
- 4904 Pure mathematics