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By and large, Backpropagation (BP) is regarded as one of the most important neural computation algorithms at the basis of the progress in machine learning, including the recent advances in deep learning. However, its computational structure has been the source of many debates on its arguable biological plausibility. In this paper, it is shown that when framing supervised learning in the Lagrangian framework, while one can see a natural emergence of Backpropagation, biologically plausible local algorithms can also be devised that are based on the search for saddle points in the learning adjoint space composed of weights, neural outputs, and Lagrangian multipliers. This might open the doors to a truly novel class of learning algorithms where, because of the introduction of the notion of support neurons, the optimization scheme also plays a fundamental role in the construction of the architecture.
[1] Yann Le Cun,et al. A Theoretical Framework for Back-Propagation , 1988 .
[2] Stephen Grossberg,et al. Competitive Learning: From Interactive Activation to Adaptive Resonance , 1987, Cogn. Sci..
[3] Yoshua Bengio,et al. Towards Biologically Plausible Deep Learning , 2015, ArXiv.
[4] Yoshua Bengio,et al. Towards a Biologically Plausible Backprop , 2016, ArXiv.
[5] John C. Platt,et al. Constrained Differential Optimization , 1987, NIPS.