Robust Bayesian inference with gapped LISA data using all-in-one TDI-$\infty$

TL;DR

This paper introduces TDI-$ infty$, a novel Bayesian inference method for LISA data that effectively handles data gaps and multiple noise sources, improving gravitational wave signal analysis in the presence of measurement interruptions.

Contribution

The paper presents TDI-$ infty$, an all-in-one TDI approach that marginalizes over laser and other noise sources, and robustly manages data gaps within a Bayesian inference framework.

Findings

TDI-$ infty$ outperforms classical TDI in scenarios with data gaps.

The method effectively cancels multiple noise sources beyond laser noise.

It maintains signal integrity and is suitable for low-latency gravitational wave analysis.

Abstract

The Laser Interferometer Space Antenna (LISA), an ESA L-class mission, is designed to detect gravitational waves in the millihertz frequency band, with operations expected to begin in the next decade. LISA will enable studies of astrophysical phenomena such as massive black hole mergers, extreme mass ratio inspirals, and compact binary systems. A key challenge in analyzing LISA's data is the significant laser frequency noise, which must be suppressed using time-delay interferometry (TDI). Classical TDI mitigates this noise by algebraically combining phase measurements taken at different times and spacecraft. However, data gaps caused by instrumental issues or operational interruptions complicate the process. These gaps affect multiple TDI samples due to the time delays inherent to the algorithm, rendering surrounding measurements unusable for parameter inference. In this paper, we apply the recently proposed variant of TDI known as TDI-$\infty$ to astrophysical parameter inference, focusing on the challenge posed by data gaps. TDI-$\infty$ frames the LISA likelihood numerically in terms of raw measurements, marginalizing over laser phase noises under the assumption of infinite noise variance. Additionally, TDI-$\infty$ is set up to incorporate and cancel other noise sources beyond laser noise, including optical bench motion, clock noise, and modulation noise, establishing it as an all-in-one TDI solution. The method gracefully handles measurement interruptions, removing the need to explicitly address discontinuities during template matching. We integrate TDI-$\infty$ into a Bayesian framework, demonstrating its superior performance in scenarios involving gaps. Compared to classical TDI, the method preserves signal integrity more effectively and is particularly interesting for low-latency applications, where the limited amount of available data makes data gaps particularly disruptive.