Proportionate vs disproportionate distribution of wealth of two individuals in a tempered Paretian ensemble

Abstract

We study the distribution P(ω) of the random variable ω = x1/(x1 + x2), where x1 and x2 are the wealths of two individuals selected at random from the same tempered Paretian ensemble characterized by the distribution (x) φ(x)/x1 + α, where α > 0 is the Pareto index and φ(x) is the cut-off function. We consider two forms of φ(x): a bounded function φ(x) = 1 for L ≤ x ≤ H, and zero otherwise, and a smooth exponential function φ(x) = (-L/x - x/H). In both cases (x) has moments of arbitrary order. We show that, for α > 1, P(ω) always has a unimodal form and is peaked at ω = 1/2, so that most probably x1 ≈ x2. For 0 < α < 1 we observe a more complicated behavior which depends on the value of δ = L/H. In particular, for δ < δc - a certain threshold value - P(ω) has a three-modal (for a bounded φ(x)) and a bimodal M-shape (for an exponential φ(x)) form which signifies that in such ensembles the wealths x1 and x2 are disproportionately different.