In the second chapter, first of all, we have decomposed singularly perturbed problems for third order ordinary differential equations into the first order ordinary differential equations and singularly perturbed problems for second order ordinary differential equations.

In this paper the assumption of normal distribution of random variables and the first order pertubation method are adopted.

On the basis of considering the local structure of an abstract bifurcation equation involving higher order perturbations and simple eigenvalues and more smooth assumptions, we obtained precise bounds for the number of the distinct small bifurcation of solutions as a function of the parameter.