Nonlinear Functional Analysis: Bifurcation Theory
Several non-linear problems relevant in practical applications can be expressed as a fixed point equation. In many cases, it is crucial to investigate how the model’s behavior changes with variations in a parameter, denoted as $\lambda$. In practical applications, $\lambda$ represents a physical or empirical magnitude of interest. Bifurcation Theory is a subfield in Nonlinear Functional Analysis that tries to study the general behavior of the equations that can be written as $\mathfrak{F}(\lambda, u)=0$ where $\lambda$ is the bifurcation parameter. ...