A quasi-solution approach to nonlinear problems - the case of Blasius similarity solution

Abstract

Using the simple case of Blasius similarity solution, we illustrate a recently developed general method that reduces a strongly nonlinear problem into a weakly nonlinear analysis. The basic idea is to find a quasi-solution F0 that satisfies the nonlinear problem and boundary conditions to within small errors. Then, by decomposing the true solution F=F0+E, a weakly nonlinear analysis of E, using contraction mapping theorem in a suitable space of functions provides the existence of solution as well as bounds on the error E. The quasi-solution construction relies on a combination of exponential asymptotics and standard orthogonal polynomial representations in finite domain.