What are applications of asymptotic freeness of random matrices?

Question

In around 1990 Voiculescu showed asymptotic freeness of certain random matrices, i.e., free independence when the matrix size goes to infinity. Since then this link between free probability and random matrices has been the subject of much research. For example, asymptotic freeness has been shown for various classes of random matrices.

Random matrices have various applications, though only some of them involve matrices increasing in size. I think it would be interesting and useful to have a list of applications where asymptotic freeness of random matrices is used. This to motivate the study of asymptotic freeness.

Wireless communication appears to be one such example: in their book "Random Matrix Theory and Wireless Communications", Tulino and Verdu cover random matrices, free probability, and applications to wireless communications. It seems it also finds application to neural networks, judging from a search on Google Scholar, though I wouldn't know how.

Are there any other, perhaps surprising, applications of asymptotic freeness of random matrices? Links to sources would be much appreciated.

Answer 1

Here are some applications of free probability of random matrices:

• Neural networks: The asymptotic freeness assumption plays a fundamental role in the study of the propagation of spectral distributions through the layers of a deep neural network, see Asymptotic Freeness of Layerwise Jacobians Caused by Invariance of Multilayer Perceptron (2021) and Free Probability for predicting the performance of feed-forward fully connected neural networks (2022).
• Wireless communication: The asymptotic capacity limit of a multi-antenna channel can be calculated from the an asymptotic free probability assumptions, see Free Probability based Capacity Calculation of Multiantenna Gaussian Fading Channels with Cochannel Interference (2010).
• Quantum information: Free probability is helpful to understand the problem of the quantificatio of the degree of entanglement of a multi-qubit system, see Applications of free probability to quantum information theory (2014).
• Statistical physics: The free energy of exclusion processes can be calculated using tools from free probability, see Bernoulli variables, classical exclusion processes and free probability (2022).

Answer 2

Here are a few additional references, in the same directions as in Carlo's answer.

Wireless communication:

Channel Estimation and Robust Detection for IQ Imbalanced Uplink Massive MIMO-OFDM With Adjustable Phase Shift Pilots (Chen, You, Lu, Gao and Xia ,2021)

Neural networks:

Demystifying Disagreement-on-the-Line in High Dimensions (Lee, Moniri, Huang, Dobriban and Hassan 2023)

The Neural Tangent Kernel in High Dimensions: Triple Descent and a Multi-Scale Theory of Generalization (Adlam and Pennington, 2020)

Approximate Message Passing algorithms for rotationally invariant matrices (Fan, 2022)

Statistical Physics:

General Eigenstate Thermalization via Free Cumulants in Quantum Lattice Systems (Pappalardi, Fritzsch and Prosen 2023)

Designs via Free Probability (Fava, Kurchan and Pappalardi, 2023)

Spectrum of subblocks of structured random matrices : A free probability approach (Bernard and Hruza, 2023)