A test of the Suyama-Yamaguchi inequality from weak lensing

Abstract

We investigate the weak lensing signature of primordial non-Gaussianities of the local type by constraining the magnitude of the weak convergence bi- and trispectra expected for the EUCLID weak lensing survey. Starting from expressions for the weak convergence spectra, bispectra and trispectra, whose relative magnitudes we investigate as a function of scale, we compute their respective signal to noise ratios by relating the polyspectra's amplitude to their Gaussian covariance using a Monte-Carlo technique for carrying out the configuration space integrations. In computing the Fisher-matrix on the non-Gaussianity parameters fnl, gnl and taunl with a very similar technique, we can derive Bayesian evidences for a violation of the Suyama-Yamaguchi relation taunl>=(6 fnl/5)2 as a function of the true fnl and taunl-values and show that the relation can be probed down to levels of fnl~102 and taunl~105. In a related study, we derive analytical expressions for the probability density that the SY-relation is exactly fulfilled, as required by models in which any one field generates the perturbations. We conclude with an outlook on the levels of non-Gaussianity that can be probed with tomographic lensing surveys.