# Resonant Machine Learning Based on Complex Growth Transform Dynamical   Systems

**Authors:** Oindrila Chatterjee, Shantanu Chakrabartty

arXiv: 1908.05377 · 2020-04-10

## TL;DR

This paper introduces a novel energy-efficient machine learning framework inspired by electrical resonance, utilizing complex growth transform dynamical systems to optimize learning while maintaining zero reactive power.

## Contribution

It proposes a new energy-based learning model combining active and reactive energies, driven by complex-domain growth transforms, with applications to resonant SVMs.

## Key findings

- Supports the design of self-sustained resonant SVMs
- Demonstrates active-power regularization improves learning
- Shows convergence controlled by an annealing process

## Abstract

Traditional energy-based learning models associate a single energy metric to each configuration of variables involved in the underlying optimization process. Such models associate the lowest energy state to the optimal configuration of variables under consideration, and are thus inherently dissipative. In this paper we propose an energy-efficient learning framework that exploits structural and functional similarities between a machine learning network and a general electrical network satisfying the Tellegen's theorem. In contrast to the standard energy-based models, the proposed formulation associates two energy components, namely, active and reactive energy to the network. This ensures that the network's active-power is dissipated only during the process of learning, whereas the reactive-power is maintained to be zero at all times. As a result, in steady-state, the learned parameters are stored and self-sustained by electrical resonance determined by the network's nodal inductances and capacitances. Based on this approach, this paper introduces three novel concepts: (a) A learning framework where the network's active-power dissipation is used as a regularization for a learning objective function that is subjected to zero total reactive-power constraint; (b) A dynamical system based on complex-domain, continuous-time growth transforms which optimizes the learning objective function and drives the network towards electrical resonance under steady-state operation; and (c) An annealing procedure that controls the trade-off between active-power dissipation and the speed of convergence. As a representative example, we show how the proposed framework can be used for designing resonant support vector machines (SVMs), where we show that the support-vectors correspond to an LC network with self-sustained oscillations.

## Full text

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## Figures

13 figures with captions in the complete paper: https://tomesphere.com/paper/1908.05377/full.md

## References

42 references — full list in the complete paper: https://tomesphere.com/paper/1908.05377/full.md

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Source: https://tomesphere.com/paper/1908.05377