Eleonora Cinti, Felix Otto
Published 2015-09-02Version 1
We prove some interpolation inequalities which arise in the analysis of pattern formation in physics. They are the strong version of some already known estimates in weak form that are used to give a lower bound of the energy in many contexts (coarsening and branching in micromagnetics and superconductors). The main ingredient in the proof of our inequalities is a geometric construction which was first used by Choksi, Conti, Kohn, and one of the authors in the study of branching in superconductors.
Lower Bound and Space-time Decay Rates of Higher Order Derivatives of Solution for the Compressible Navier-Stokes and Hall-MHD Equations
A consequence of a lower bound of the K-energy
Upper and lower bounds for normal derivatives of spectral clusters of Dirichlet Laplacian
![QR code for arXiv:1509.01189 [math.AP]](http://oss.arxitics.com/images/favicon.svg)