Non-spurious solutions to second order BVP by monotonicity methods

Abstract

We consider the following BVP x( t) =f( t,x( t) ,x( t) ) -h( t) , % x( 0) =x( 1) =0, where f is continuous and satisfies some other conditions, h∈ H01( 0,1) together with its discretization -2x(k-1)+1n2f(kn, n x(k-1), x(k))=1n2h(kn), k∈ \1, 2, …,n \. Using monotonicity methods we obtain the convergence of a solutions to a family of discrete problems to the solution of a continuous one, i.e. the existence of non-spurious solutions to the above problems is considered. Continuous dependence on parameters for the continuous problem is also investigated.