Uma introdução aos resultados do tipo ambrosetti-prodi.

Abstract

The study of functions and their properties is the focus of some areas of mathematics, such as Analysis, Differential Equations and Applied Mathematics. The objective of this work is to present a set of Ambrosetti-Prod type results, which consists of solving a (P) equation of the form G(u, s) = 0, finding a real parameter s and a value s1 ∈ R, where the equation (P) is no longer a solution when s < s1, has at least one solution when s = s1 e have at least two when s > s1. We present a study of three equations, a simple one, and the other two differential equations, namely: f(u) = s, u 0 (x) + f(u(x)) = s e u 0 (x) + f(x, u(x)) = s. This work was based on the first chapters of the article [1], it has a qualitative approach and the research is a bibliographical one, since it tried to understand the behavior of the solutions of an equation without worrying about finding them.