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Large-scale non-Gaussian mass function and halo bias: tests on<i>N</i>-body simulations

M. GrossiMax-Planck-Institut fuer Astrophysik, Karl-Schwarzschild Strasse 1, D-85748 Garching, GermanyLicia VerdeICREA (Institució Catalana de Recerca i Estudis Avançats)C. CarboneInstitute of Space Sciences (CSIC–IEEC), UAB, Barcelona 08193, SpainK. DolagMax-Planck-Institut fuer Astrophysik, Karl-Schwarzschild Strasse 1, D-85748 Garching, GermanyE. BranchiniDipartimento di Fisica, Università di Roma TRE, via della Vasca Navale 84, I-00146 Roma, ItalyFrancesca IannuzziDipartimento di Astronomia, Università di Bologna, via Ranzani 1, I-40127 Bologna, ItalyS. MatarreseDipartimento di Fisica ‘G. Galilei’, Università degli Studi di Padova and INFN Sezione di Padova, via Marzolo 8, I-35131 Padova, ItalyL. MoscardiniDipartimento di Astronomia, Università di Bologna, via Ranzani 1, I-40127 Bologna, Italy
2009en
ABI

Abstract

The description of the abundance and clustering of haloes for non-Gaussian initial conditions has recently received renewed interest, motivated by the forthcoming large galaxy and cluster surveys, which can potentially yield constraints of the order of unity on the non-Gaussianity parameter fNL. We present tests on N-body simulations of analytical formulae describing the halo abundance and clustering for non-Gaussian initial conditions. We calibrate the analytic non-Gaussian mass function of Matarrese, Verde &amp;amp; Jimenez and LoVerde et al. and the analytic description of clustering of haloes for non-Gaussian initial conditions on N-body simulations. We find an excellent agreement between the simulations and the analytic predictions if we make the corrections and , where q ~= 0.75, in the density threshold for gravitational collapse and in the non-Gaussian fractional correction to the halo bias, respectively. We discuss the implications of this correction on present and forecasted primordial non-Gaussianity constraints. We confirm that the non-Gaussian halo bias offers a robust and highly competitive test of primordial non-Gaussianity.

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