Deduction of the Bromilow's time-cost model from the fractal nature of activity networks

Abstract

In 1969 Bromilow observed that the time T to execute a construction project follows a power law scaling with the project cost C, T CB [Bromilow 1969]. While the Bromilow's time-cost model has been extensively tested using data for different countries and project types, there is no theoretical explanation for the algebraic scaling. Here I mathematically deduce the Bromilow's time-cost model from the fractal nature of activity networks. The Bromislow's exponent is B=1-α, where 1-α is the scaling exponent between the number of activities in the critical path L and the number of activities N, L N1-α with 0≤α<1 [Vazquez et al 2023]. I provide empirical data showing that projects with low serial/parallel (SP)% have lower B values than those with higher SP%. I conclude that the Bromilow's time-cost model is a law of activity networks, the Bromilow's exponent is a network property and forecasting project duration from cost should be limited to projects with high SP%.