On the solutions of a boundary value problem arising in free convection with prescribed heat flux

Abstract

For given a∈, c<0, we are concerned with the solution fb of the differential equation f+ff+(f)=0, satisfying the initial conditions f(0)=a, f'(0)=b, f''(0)=c< 0, where g is some nonnegative subquadratic locally Lipschitz function. It is proven that there exists b*>0 such that fb exists on [0,+∞) and is such that f'b(t) 0 as t+∞, if and only if b≥ b*. This allows to answer questions about existence, uniqueness and boundedness of solutions to a boundary value problem arising in fluid mechanics, and especially in boundary layer theory.