VS265: Syllabus
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Syllabus
Introduction
- Theory and modeling in neuroscience
- Goals of AI/machine learning vs. theoretical neuroscience
- Turing vs. neural computation
Neuron models
- Membrane equation, compartmental model of a neuron
- Linear systems: vectors, matrices, linear neuron models
- Perceptron model and linear separability
Supervised learning
- Perceptron learning rule
- Adaptation in linear neurons, Widrow-Hoff rule
- Objective functions and gradient descent
- Multilayer networks and backpropagation
Unsupervised learning
- Linear Hebbian learning and PCA, decorrelation
- Winner-take-all networks and clustering
- Sparse, distributed coding
Plasticity and cortical maps
- Cortical maps
- Self-organizing maps, Kohonen nets
- Models of experience dependent learning and cortical reorganization
- Manifold learning
Recurrent networks
- Hopfield networks
- Models of associative memory, pattern completion
- Line attractors and `bump circuits’
- Dynamical models
Probabilistic models and inference
- Probability theory and Bayes’ rule
- Learning and inference in generative models
- The mixture of Gaussians model
- Boltzmann machines
- Sparse coding and ‘ICA’
- Kalman filter model
- Energy-based models
Neural implementations
- Integrate-and-fire model
- Neural encoding and decoding
- Limits of precision in neurons
- Neural synchrony and phase-based coding
