Chasing the peak: optimal statistics for weak shear analyses

TL;DR

This paper investigates alternative statistical methods for weak gravitational lensing analysis, demonstrating that certain estimators and Fourier mode fitting can reduce noise bias and improve accuracy in measuring cosmic shear.

Contribution

It introduces and evaluates robust, unbiased estimators and Fourier mode fitting techniques that outperform traditional methods in weak shear analysis, especially under noisy conditions.

Findings

Estimators like least absolute deviations and convex hull peeling reduce noise bias.

Fourier mode fitting effectively models the shear pattern in galaxy ellipticities.

Certain estimators improve measurement efficiency by over 50%.

Abstract

Weak gravitational lensing analyses are fundamentally limited by the intrinsic, non-Gaussian distribution of galaxy shapes. We explore alternative statistics for samples of ellipticity measurements that are unbiased, efficient, and robust. We take the non-linear mapping of gravitational shear and the effect of noise into account. We then discuss how the distribution of individual galaxy shapes in the observed field of view can be modeled by fitting Fourier modes to the shear pattern directly. We simulated samples of galaxy ellipticities, using both theoretical distributions and real data for ellipticities and noise. We determined the possible bias $\Delta e$, the efficiency $\eta$ and the robustness of the least absolute deviations, the biweight, and the convex hull peeling estimators, compared to the canonical weighted mean. Using these statistics for regression, we have shown the applicability of direct Fourier mode fitting. These estimators can be unbiased in the absence of noise, and decrease noise bias by more than $\sim 30\%$. The convex hull peeling estimator distribution is centered around the underlying shear, and its bias least affected by noise. The least absolute deviations estimator to be the most efficient estimator in almost all cases, except in the Gaussian case, where it's still competitive ($0.83<\eta <5.1$) and therefore robust. These results hold when fitting Fourier modes, where amplitudes of variation in ellipticity are determined to the order of $10^{-3}$. The peak of the ellipticity distribution is a direct tracer of the underlying shear and unaffected by noise, and we have shown that estimators that are sensitive to a central cusp perform more efficiently, potentially reducing uncertainties by more than $50\%$ and significantly decreasing noise bias.