Constraints on general primordial non-Gaussianity using wavelets for the Wilkinson Microwave anisotropy probe 7-year data

TL;DR

This paper uses wavelet analysis on WMAP 7-year data to constrain primordial non-Gaussianity, finding results compatible with Gaussian fluctuations and emphasizing the importance of accounting for unresolved point sources.

Contribution

It introduces a wavelet-based method to measure non-Gaussianity parameters for different shapes and assesses the impact of unresolved point sources on these measurements.

Findings

Constraints on fnl are compatible with Gaussianity within 2σ.

Unresolved point sources significantly affect fnl estimates.

Results are consistent with previous WMAP analyses.

Abstract

We present constraints on the non-linear coupling parameter fnl with the Wilkinson Microwave Anisotropy Probe (WMAP) data. We use the method based on the spherical Mexican hat wavelet (SMHW) to measure the fnl parameter for three of the most interesting shapes of primordial non-Gaussianity: local, equilateral and orthogonal. Our results indicate that this parameter is compatible with a Gaussian distribution within the two sigma confidence level (CL) for the three shapes and the results are consistent with the values presented by the WMAP team. We have included in our analysis the impact on fnl due to contamination by unresolved point sources. The point sources add a positive contribution of Delta(fnl) = 2.5 \pm 3.0, Delta(fnl) = 37 \pm 18 and Delta(fnl) = 25 \pm 14 for the local, equilateral and orthogonal cases respectively. As mentioned by the WMAP team, the contribution of the point sources to the orthogonal and equilateral form is expected to be larger than the local one and thus it cannot be neglected in future constraints on these parameters. Taking into account this contamination, our best estimates for fnl are -16.0 \leq fnl \leq 76.0, -382 \leq fnl \leq 202 and -394 \leq fnl \leq 34 at 95% CL for the local, equilateral and orthogonal cases respectively. The three shapes are compatible with zero at 95% CL (2{\sigma}). Our conclusion is that the WMAP 7-year data are consistent with Gaussian primordial fluctuations within ~2{\sigma} CL. We stress however the importance of taking into account the unresolved point sources in the measurement of fnl in future works, especially when using more precise data sets such as the forthcoming Planck data.