Quasi-periodic Gaussian Processes for stellar activity: from physical to kernel parameters

TL;DR

This study evaluates the physical interpretability of quasi-periodic Gaussian Process kernels in modeling stellar activity, demonstrating their effectiveness in recovering stellar rotation and spot evolution parameters from simulated data.

Contribution

The paper assesses the reliability of QP and QPC Gaussian Process kernels in accurately retrieving physical stellar parameters from simulated light and radial velocity data.

Findings

Excellent recovery of stellar rotation periods.

Good agreement of spot decay timescales with hyperparameters.

Noise and sampling significantly affect hyperparameter estimation.

Abstract

In recent years, Gaussian Process (GP) regression has become widely used to analyse stellar and exoplanet time-series data sets. For spotted stars, the most popular GP covariance function is the quasi-periodic (QP) kernel, whose the hyperparameters of the GP have a plausible interpretation in terms of physical properties of the star and spots. In this paper, we test the reliability of this interpretation by modelling data simulated using a spot model using a QP GP, and the recently proposed quasi-periodic plus cosine (QPC) GP, comparing the posterior distributions of the GP hyperparameters to the input parameters of the spot model. We find excellent agreement between the input stellar rotation period and the QP and QPC GP period, and very good agreement between the spot decay timescale and the length scale of the squared exponential term. We also compare the hyperparameters derived from light and radial velocity (RV) curves for a given star, finding that the period and evolution timescales are in good agreement. However, the harmonic complexity of the GP, while displaying no clear correlation with the spot properties in our simulations, is systematically higher for the RV than for the light curve data. Finally, for the QP kernel, we investigate the impact of noise and time-sampling on the hyperparameters in the case of RVs. Our results indicate that good coverage of rotation period and spot evolution time-scales is more important than the total number of points, and noise characteristics govern the harmonic complexity.