Formalization of the generalized Pareto principle and structural typicality of the 20/80-rule

Abstract

We formalize a generalized form of the Pareto principle - ``fraction p of inputs yields fraction 1-p of outputs'' - as a property of non-negative gain densities ∈ L1([0,1]), working with the decreasing rearrangement to obtain a unique characterization. For probability distributions, the resulting p coincides with 1 - kF, where kF is the Kolkata index of the corresponding Lorenz curve. Within this framework we analyze both constructed gain densities and commonly encountered distribution families. We derive closed-form expressions for p for truncated power-law, exponential, and normal distribution families. Combining these with estimates of the truncation parameter as a function of sample size N, we predict that datasets of size N ∈ [102, 105] from exponential and normal families concentrate p near [0.15, 0.26] and [0.20, 0.29] - values close to the canonical 0.2/0.8-rule, and strictly below the saturation k ≈ 0.865 conjectured earlier by Ghosh and Chakrabarti. We discuss the implications of the structural ubiquity of Pareto-type imbalances for their use as prescriptive targets.