My question concerns approximating permanent of an $n$-by-$n$ matrix.
Several approximation algorithms have been proposed in the literature for this purpose, whose time complexity depend on $n$ and accuracy $\epsilon$ (e.g., in the following paper by Linial et al.: "A deterministic strongly polynomial algorithm for matrix scaling and approximate permanents.")
In order to get an FPTAS, we have to choose $\epsilon$ as a function of $n$. For examples it is mentioned in Linial's paper that for the purpose of approximating the permanent, it suffices to choose $\epsilon=n^{-2}$ (last paragraphs of Section 1 of the above paper).
Anyone could give me some hints why this choice of $\epsilon$ is sufficient?
