Exact Analytical Solutions of the Colebrook-White Equation: Fid-Bau Portal

Exact Analytical Solutions of the Colebrook-White Equation

Mikata, Yozo / Walczak, Walter S.

The primary results of this paper are two exact analytical solutions of the Colebrook-White equation (1939), one by an infinite recursion and the other by an integral. These solutions are the first exact analytical solutions of the Colebrook-White equation that do not use a special transcendental function such as the Lambert $W$ function. An explicit approximate formula for the Colebrook-White equation, called the $n$ th formula, is also developed on the basis of one of the exact solutions by truncation. The key result in this development is the closed-form expression for an associated function of the Lambert $W$ function, called the $Y$ function, expressed by an infinite recursion. Once the $Y$ function is obtained in a closed-form using a recursive function, it can be applied to the $W$ function and to the Colebrook-White equation. It is shown numerically that the absolute error of the Darcy friction factor decreases geometrically toward zero as the recursion depth of the $n$ th formula increases. Additionally, the recursion depth of the $n$ th formula may be preferentially chosen to yield a solution that is consistently larger or smaller than the exact solution.