Siamese networks: The tale of two manifolds
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Roy, Soumava Kumar
Harandi, Mehrtash
Nock, Richard
Hartley, Richard
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IEEE, Institute of Electrical and Electronics Engineers
Abstract
Siamese networks are non-linear deep models that have
found their ways into a broad set of problems in learning
theory, thanks to their embedding capabilities. In this paper, we study Siamese networks from a new perspective and
question the validity of their training procedure. We show
that in the majority of cases, the objective of a Siamese network is endowed with an invariance property. Neglecting
the invariance property leads to a hindrance in training the
Siamese networks. To alleviate this issue, we propose two
Riemannian structures and generalize a well-established accelerated stochastic gradient descent method to take into
account the proposed Riemannian structures. Our empirical
evaluations suggest that by making use of the Riemannian
geometry, we achieve state-of-the-art results against several algorithms for the challenging problem of fine-grained
image classification.
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Proceedings of the 2019 IEEE/CVF International Conference on Computer Vision (ICCV 2019)
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Restricted until
2099-12-31
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