Erratum to “Analytic Solutions of a Second-Order Iterative Functional Differential Equation”

This paper is concerned with a second-order iterative functional differential equation x'(z) = (xm(z)) 2. Its analytic solutions are discussed by locally reducing the equation to another functional differential equation with proportional delays ~2y'(l.tz)y~(z) = i.Ly~(l.~z)y'(z) + [~It(Z)]3 [~([J, m

This paper is concerned with an iterative functional differential equation x x r z = c 0 z + c 1 x z + c 2 x x z + • • • + c m x m z , where r and m are nonnegative integers, x 0 z = z x 1 z = x z x 3 z = x x x z , etc. are the iterates of the function x z , and m j=0 c j = 0. By constructing a conv

This paper concerns the existence of positive solutions to a singular differential equation with the boundary conditions where λ, γ > 0, f (t) ∈ C[0, 1] and f (t) > 0 on [0, 1]. By theories of ordinary differential equations, Bertsch and Ughi [M. Bertsch, M. Ughi, Positivity properties of viscosit