TY - JOUR
T1 - Detection of anomalies amongst LIGO’s glitch populations with autoencoders
AU - Laguarta, Paloma
AU - van der Laag, Robin
AU - Lopez, Melissa
AU - Dooney, Tom
AU - Miller, Andrew L.
AU - Schmidt, Stefano
AU - Cavaglia, Marco
AU - Caudill, Sarah
AU - Driessens, Kurt
AU - Karel, Joël
AU - Lenders, Roy
AU - Van Den Broeck, Chris
N1 - Publisher Copyright:
© 2024 IOP Publishing Ltd.
PY - 2024/3/7
Y1 - 2024/3/7
N2 - Gravitational wave (GW) interferometers are able to detect a change in distance of ~1/10 000th the size of a proton. Such sensitivity leads to large rates of non-gaussian, transient bursts of noise, also known as glitches, which hinder the detection and parameter estimation of short- and long-lived GW signals in the main detector strain. Glitches, come in a wide range of frequency-amplitude-time morphologies and may be caused by environmental or instrumental processes, so a key step towards their mitigation is to understand their population. Current approaches for their identification use supervised models to learn their morphology in the main strain with a fixed set of classes, but do not consider relevant information provided by auxiliary channels that monitor the state of the interferometers. In this work, we present an unsupervised algorithm to find anomalous glitches. Firstly, we encode a subset of auxiliary channels from Laser Interferometer Gravitational-Wave Observatory Livingston in the fractal dimension (FD), which measures the complexity of the signal. For this aim, we speed up the fractal dimension calculation to encode 1 h of data in 11 s. Secondly, we learn the underlying distribution of the data using an autoencoder with cyclic periodic convolutions. In this way, we learn the underlying distribution of glitches and we uncover unknown glitch morphologies, and overlaps in time between different glitches and misclassifications. This led to the discovery of 6.6 % anomalies in the input data. The results of this investigation stress the learnable structure of auxiliary channels encoded in FD and provide a flexible framework for glitch discovery.
AB - Gravitational wave (GW) interferometers are able to detect a change in distance of ~1/10 000th the size of a proton. Such sensitivity leads to large rates of non-gaussian, transient bursts of noise, also known as glitches, which hinder the detection and parameter estimation of short- and long-lived GW signals in the main detector strain. Glitches, come in a wide range of frequency-amplitude-time morphologies and may be caused by environmental or instrumental processes, so a key step towards their mitigation is to understand their population. Current approaches for their identification use supervised models to learn their morphology in the main strain with a fixed set of classes, but do not consider relevant information provided by auxiliary channels that monitor the state of the interferometers. In this work, we present an unsupervised algorithm to find anomalous glitches. Firstly, we encode a subset of auxiliary channels from Laser Interferometer Gravitational-Wave Observatory Livingston in the fractal dimension (FD), which measures the complexity of the signal. For this aim, we speed up the fractal dimension calculation to encode 1 h of data in 11 s. Secondly, we learn the underlying distribution of the data using an autoencoder with cyclic periodic convolutions. In this way, we learn the underlying distribution of glitches and we uncover unknown glitch morphologies, and overlaps in time between different glitches and misclassifications. This led to the discovery of 6.6 % anomalies in the input data. The results of this investigation stress the learnable structure of auxiliary channels encoded in FD and provide a flexible framework for glitch discovery.
KW - auxiliary channels
KW - gravitational waves
KW - machine learning
UR - http://www.scopus.com/inward/record.url?scp=85184022017&partnerID=8YFLogxK
U2 - 10.1088/1361-6382/ad1f26
DO - 10.1088/1361-6382/ad1f26
M3 - Article
AN - SCOPUS:85184022017
SN - 0264-9381
VL - 41
JO - Classical and Quantum Gravity
JF - Classical and Quantum Gravity
IS - 5
M1 - 055004
ER -