Global Strong Solution With BV Derivatives to Singular Solid-on-Solid model With Exponential Nonlinearity

Abstract

In this work, we consider the one dimensional very singular fourth-order equation for solid-on-solid model in attachment-detachment-limit regime with exponential nonlinearity ht = ∇ · (1|∇ h| ∇ eδ Eδ h) =∇ · (1|∇ h|∇ e- ∇ · (∇ h|∇ h|)) where total energy E=∫ |∇ h| is the total variation of h. Using a logarithmic correction E=∫ |∇ h||∇ h| d x and gradient flow structure with a suitable defined functional, we prove the evolution variational inequality solution preserves a positive gradient hx which has upper and lower bounds but in BV space. We also obtain the global strong solution to the solid-on-solid model which allows an asymmetric singularity hxx+ happens.