On the transversality conditions and their genericity

Abstract

In this note we review some results on the transversality conditions for a smooth Fredholm map \(f: \mathsf X\times (0,T) \rightarrow \mathsf Y\) between two Banach spaces \(\mathsf X,\mathsf Y\). These conditions are well-known in the realm of bifurcation theory and commonly accepted as “generic”. Here we show that under the transversality assumptions the sections \({\mathcal C}(t)=\{x:f(x,t)=0\}\) of the zero set of \(f\) are discrete for every \(t\in (0,T)\) and we discuss a somehow explicit family of perturbations of \(f\) along which transversality holds up to a residual set. The application of these results to the case when \(f\) is the \(\mathsf X\)-differential of a time-dependent energy functional \(\fancyscript{E}:\mathsf X\times (0,T)\rightarrow \mathbb {R}\) and \({\mathcal C}(t)\) is the set of the critical points of \(\fancyscript{E}\) provides the motivation and the main example of this paper.