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Bibliographic Details
Main Authors: Pinkney, Carla, Euan, Carolina, Gibberd, Alex, Shojaie, Ali
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2403.12908
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author Pinkney, Carla
Euan, Carolina
Gibberd, Alex
Shojaie, Ali
author_facet Pinkney, Carla
Euan, Carolina
Gibberd, Alex
Shojaie, Ali
contents Advances in modern technology have enabled the simultaneous recording of neural spiking activity, which statistically can be represented by a multivariate point process. We characterise the second order structure of this process via the spectral density matrix, a frequency domain equivalent of the covariance matrix. In the context of neuronal analysis, statistics based on the spectral density matrix can be used to infer connectivity in the brain network between individual neurons. However, the high-dimensional nature of spike train data mean that it is often difficult, or at times impossible, to compute these statistics. In this work, we discuss the importance of regularisation-based methods for spectral estimation, and propose novel methodology for use in the point process setting. We establish asymptotic properties for our proposed estimators and evaluate their performance on synthetic data simulated from multivariate Hawkes processes. Finally, we apply our methodology to neuroscience spike train data in order to illustrate its ability to infer brain connectivity.
format Preprint
id arxiv_https___arxiv_org_abs_2403_12908
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Regularised Spectral Estimation for High-Dimensional Point Processes
Pinkney, Carla
Euan, Carolina
Gibberd, Alex
Shojaie, Ali
Methodology
Advances in modern technology have enabled the simultaneous recording of neural spiking activity, which statistically can be represented by a multivariate point process. We characterise the second order structure of this process via the spectral density matrix, a frequency domain equivalent of the covariance matrix. In the context of neuronal analysis, statistics based on the spectral density matrix can be used to infer connectivity in the brain network between individual neurons. However, the high-dimensional nature of spike train data mean that it is often difficult, or at times impossible, to compute these statistics. In this work, we discuss the importance of regularisation-based methods for spectral estimation, and propose novel methodology for use in the point process setting. We establish asymptotic properties for our proposed estimators and evaluate their performance on synthetic data simulated from multivariate Hawkes processes. Finally, we apply our methodology to neuroscience spike train data in order to illustrate its ability to infer brain connectivity.
title Regularised Spectral Estimation for High-Dimensional Point Processes
topic Methodology
url https://arxiv.org/abs/2403.12908