# Quantum computing and the brain: quantum nets, dessins d'enfants and   neural networks

**Authors:** Torsten Asselmeyer-Maluga

arXiv: 1812.08338 · 2019-02-20

## TL;DR

This paper establishes a formal connection between neural networks and quantum computing by modeling neural interactions with graph theory, complex signals, and dessins d'enfants, leading to a quantum network framework.

## Contribution

It introduces a novel mathematical model linking neural networks to quantum computing using graph deformations, complex manifolds, and dessins d'enfants, bridging machine learning and quantum circuits.

## Key findings

- Neural networks can be modeled using graph deformations and fundamental groups.
- Signals in neural networks form a complex manifold encoding network properties.
- Dessins d'enfants serve as a bridge to topological quantum computing.

## Abstract

In this paper, we will discuss a formal link between neural networks and quantum computing. For that purpose we will present a simple model for the description of the neural network by forming sub-graphs of the whole network with the same or a similar state. We will describe the interaction between these areas by closed loops, the feedback loops. The change of the graph is given by the deformations of the loops. This fact can be mathematically formalized by the fundamental group of the graph. Furthermore the neuron has two basic states $|0\rangle$ (ground state) and $|1\rangle$ (excited state). The whole state of an area of neurons is the linear combination of the two basic state with complex coefficients representing the signals (with 3 Parameters: amplitude, frequency and phase) along the neurons. Then it can be shown that the set of all signals forms a manifold (character variety) and all properties of the network must be encoded in this manifold. In the paper, we will discuss how to interpret learning and intuition in this model. Using the Morgan-Shalen compactification, the limit for signals with large amplitude can be analyzed by using quasi-Fuchsian groups as represented by dessins d'enfants (graphs to analyze Riemannian surfaces). As shown by Planat and collaborators, these dessins d'enfants are a direct bridge to (topological) quantum computing with permutation groups. The normalization of the signal reduces to the group $SU(2)$ and the whole model to a quantum network. Then we have a direct connection to quantum circuits. This network can be transformed into operations on tensor networks. Formally we will obtain a link between machine learning and Quantum computing.

## Full text

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## Figures

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## References

19 references — full list in the complete paper: https://tomesphere.com/paper/1812.08338/full.md

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Source: https://tomesphere.com/paper/1812.08338