Estimate for the second-order derivatives of solutions to boundary-value problems of the theory of non-Newtonian liquids

This paper presents a rigorous proof of existence and uniqueness of solutions to laminar boundary layer flow in power law non-Newtonian fluid. A theoretical estimate for skin friction coefficient is given, which is characterized by a power law exponent. The reliability and efficiency of the proposed

## In this paper, we investigate the existence of positive solutions of a second-order singular boundary value problem by constructing upper and lower solutions and combined them with properties of the consequent mapping.

We consider discrete two-point boundary value problems of the form D 2 y k+1 =f(kh; y k ; Dy k ), for k = 1; : : : ; n -1; (0; 0) = G((y0; yn); (Dy1; Dyn)), where Dy k = (y k -y k-1 )=h and h = 1=n. This arises as a ÿnite di erence approximation to y = f(x; y; y ), x ∈ [0; 1], (0; 0) = G((y(0); y(1)