O Teorema de Malgrange-Ehrenpreis

Abstract

In the first chapter of the dissertation, is a brief introduction. Then in the second chapter, are shown notions and properties of topological vector spaces. Following the present study, the third chapter, is effected the approach to the theory of distributions, which provides, as an example the Dirac delta distribution, in which, therefore, are de ned further distribution operations, including the convolution of a distribution with a test function, and finally, still in same chapter an analysis is made of distributions with compact support. In chapter four, in turn, explains to the Fourier transform and its properties, as well as properties of functions belonging to Schwartz space and also a study is made of tempered distributions. Finally, the fifth and final chapter is shown the Malgrange-Ehrenpreis theorem, which is the main theme of the work done,which states that any differential operator with constant coe cients has a fundamental solution. Thus, it implemented a study of some examples related to the theorem.