Periodicity of ideals of minors over some local rings and under deformation

Let $(R,\mathfrak{m},\mathsf{k})$ be either a fiber product or an artinian stretched Gorenstein ring, with $\operatorname{char} (\mathsf{k})\neq 2$ in the latter case. We prove that the ideals of minors of a minimal free resolution of any finitely generated $R$-module are eventually 2-periodic. Moreover, if the embedding dimension of $R$ is at least 3, eventually the ideals of minors become the powers of the maximal ideal, yielding the 1-periodicity. Moreover, if the embedding dimension of $R$ is at least 3, these ideals of minors are eventually 1-periodic. These are analogs of results obtained over complete intersections and Golod rings by Brown, Dao, and Sridhar. We also prove that the eventual periodicity of ideals of minors can be lifted from $R$ to $R[[x]]$ for all finitely generated modules over $R$. More generally, we prove that for any local ring $(R,\mathfrak{m})$, the property of the asymptotic behaviour of ideals of minors being periodic can be lifted from $R/(x)$ to $R$ whenever $x \in \mathfrak{m}$ is a super-regular element for certain classes of modules.