Nonparametric Representation of Neutron Star Equation of State Using Variational Autoencoder

Abstract

We introduce a new nonparametric representation of the neutron star (NS) equation of state (EoS) by using the variational autoencoder (VAE). As a deep neural network, the VAE is frequently used for dimensionality reduction since it can compress input data to a low-dimensional latent space using the encoder component and then reconstruct the data using the decoder component. Once a VAE is trained, one can take the decoder of the VAE as a generator. We employ 100,000 EoSs that are generated using the nonparametric representation method based on 2021ApJ...919...11H as the training set and try different settings of the neural network, then we get an EoS generator (trained VAE's decoder) with four parameters. We use the masstidal-deformability data of binary neutron star (BNS) merger event GW170817, the massradius data of PSR J0030+0451, PSR J0740+6620, PSR J0437-4715, and 4U 1702-429, and the nuclear constraints to perform the joint Bayesian inference. The overall results of the analysis that includes all the observations are R1.4=12.59+0.36-0.42\, km, 1.4=489+114-110, and M max=2.20+0.37-0.19\, M (90\% credible levels), where R1.4/1.4 are the radius/tidal-deformability of a canonical 1.4\, M NS, and M max is the maximum mass of a non-rotating NS. The results indicate that the implementation of the VAE techniques can obtain the reasonable results, while accelerate calculation by a factor of 310 or more, compared with the original method.

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