Duality Principle and Biologically Plausible Learning: Connecting the Representer Theorem and Hebbian Learning

A normative approach called Similarity Matching was recently introduced for deriving and understanding the algorithmic basis of neural computation focused on unsupervised problems. It involves deriving algorithms from computational objectives and evaluating their compatibility with anatomical and physiological observations. In particular, it introduces neural architectures by considering dual alternatives instead of primal formulations of popular models such as PCA. However, its connection to the Representer theorem remains unexplored. In this work, we propose to use teachings from this approach to explore supervised learning algorithms and clarify the notion of Hebbian learning. We examine regularized supervised learning and elucidate the emergence of neural architecture and additive versus multiplicative update rules. In this work, we focus not on developing new algorithms but on showing that the Representer theorem offers the perfect lens to study biologically plausible learning algorithms. We argue that many past and current advancements in the field rely on some form of dual formulation to introduce biological plausibility. In short, as long as a dual formulation exists, it is possible to derive biologically plausible algorithms. Our work sheds light on the pivotal role of the Representer theorem in advancing our comprehension of neural computation.