AbstractOne of the simplest polynomial recursions exhibiting chaotic behavior is the logistic map xn+1=axn(1−xn) with xn,a∈Q:xn∈[0,1]∀n∈N and a∈(0,4], the discrete-time model of the differential growth introduced by Verhulst almost two centuries ago (Verhulst, 1838) [12]. Despite the importance of this discrete map for the field of nonlinear science, explicit solutions are known only for the special cases a=2 and a=4. In this article, we propose a representation of the Verhulst logistic map in terms of a finite power series in the map’s growth parameter a and initial value x0 whose coefficients are given by the solution of a system of linear equations. Although the proposed representation cannot be viewed as a closed-form solution of the l...