Inverse Construction of the Model from a Distance-redshift Relation

Abstract

Spherically symmetric dust universe models with a positive cosmological constant , known as -Lema\itre-Tolman-Bondi() models, are considered. We report a method to construct the model from a given distance-redshift relation observed at the symmetry center. The spherical inhomogeneity is assumed to be composed of growing modes. We derive a set of ordinary differential equations for three functions of the redshift, which specify the spherical inhomogeneity. Once a distance-redshift relation is given, with careful treatment of possible singular points, we can uniquely determine the model by solving the differential equations for each value of . As a demonstration, we fix the distance-redshift relation as that of the flat model with ( dis m0, dis 0)=(0.3,0.7), where dis m0 and dis 0 are the normalized matter density and the cosmological constant, respectively. Then, we construct the model for several values of 0:=/(3H02), where H0 is the present Hubble parameter observed at the symmetry center. We obtain void structure around the symmetry center for 0< dis 0. We show the relation between the ratio 0/ dis 0 and the amplitude of the inhomogeneity.