The spectrum of a family of fourth-order equations near the global attractor

Abstract

The thin-film and quantum drift diffusion equations belong to a fourth-order family of evolution equations proposed in ref. 16 to be analogous to the (second-order) porous medium family. They are 2-Wasserstein gradient (W2) flows of the generalized Fisher information I(u) just as the porous medium family was shown to be the W2 gradient flow of the generalized entropy E(u) by Otto. The identity I(u) = |∇W2 E(u)|2/2 (formally) becomes W2 I(u*) =W22 E(u*) when linearizing the equation around its self-similar solution u*. We couple this relation with the diagonalization of W2 E(u*) for the porous medium flow computed in ref. 38. This yields information about the leading- and higher-order asymptotics of the equation on N which --- outside of special cases --- was inaccessible previously.