Abstract EN:

In this thesis ,we propose a method to solve some Cauchy probems with irregular or characteristic data by using the recent theories of generalized functions. We study a regular Cauchy problem and a regular Goursat problem in the first part with data on a monotonous curve. The second part is devoted to the setting up of an algebra adapted to the generalized Cauchy problem. In the third part, we study a generalized Goursat problem in the same way. In the fourth part,we approach a characteristic Cauchy problem by a family of non-charasteristic ones (Pe) by considering the straigth line of equation Y=ex. If ue is the solution of problem (Pe),u=[ue] is a generalized function that we consider as the generalized solution of the problem in an appropriate algebra. We give a meaning to the charasteristic Cauchy problem with irregular data by replacing it by a family of non-charasteristic problems(P(e,n)) in an appropriate algebra. The parameter e permits to replace the given problem by a non-charasteristic one,whereas the parameter n makes it regular. If U(e,n)is the solution of problem (P(e,n)),u=[u(e,n)] is a generalized function considered as the generalized solution of the problem.