Add to ORKGSurfaces arising in amorphous thin-film-growth are often described by certain classes of stochastic PDEs. In this paper we address the question of existence of unique solutions. We obtain a gap of regularity between the unique local and the global solutions, which are necessary to define statistical quantities like mean interface width or correlation functions
The paper analyses a model in surface growth, where uniqueness of weak solutions seems to be out of ...
The paper analyses a model in surface growth, where uniqueness of weak solutions seems to be out of ...
We consider the stochastic thin-film equation with colored Gaussian Stratonovich noise in one space ...
We study local existence and uniqueness for a surface growth model with space-time white noise in 2D...
We study local existence and uniqueness for a surface growth model with space-time white noise in 2D...
We construct martingale solutions to stochastic thin-film equations by introducing a (spatial) semid...
We construct martingale solutions to stochastic thin-film equations by introducing a (spatial) semid...
We study local existence and uniqueness for a surface growth model with space--time white noise in 2...
We review results on the existence and uniqueness for a surface growth model with or without space--...
We review results on the existence and uniqueness for a surface growth model with or without space--...
<p>The evolution equation derived by Xiang (SIAM J. Appl. Math. 63:241–258, 2002) to describe vicina...
We show the existence and uniqueness of solutions (either local or global for small data) for an equ...
AbstractWe study the continuum model for epitaxial thin film growth from Phys. D 132 (1999) 520–542,...
The paper analyzes a model in surface growth where the uniqueness of weak solutions seems to be out ...
The paper analyzes a model in surface growth where the uniqueness of weak solutions seems to be out ...
The paper analyses a model in surface growth, where uniqueness of weak solutions seems to be out of ...
The paper analyses a model in surface growth, where uniqueness of weak solutions seems to be out of ...
We consider the stochastic thin-film equation with colored Gaussian Stratonovich noise in one space ...
We study local existence and uniqueness for a surface growth model with space-time white noise in 2D...
We study local existence and uniqueness for a surface growth model with space-time white noise in 2D...
We construct martingale solutions to stochastic thin-film equations by introducing a (spatial) semid...
We construct martingale solutions to stochastic thin-film equations by introducing a (spatial) semid...
We study local existence and uniqueness for a surface growth model with space--time white noise in 2...
We review results on the existence and uniqueness for a surface growth model with or without space--...
We review results on the existence and uniqueness for a surface growth model with or without space--...
<p>The evolution equation derived by Xiang (SIAM J. Appl. Math. 63:241–258, 2002) to describe vicina...
We show the existence and uniqueness of solutions (either local or global for small data) for an equ...
AbstractWe study the continuum model for epitaxial thin film growth from Phys. D 132 (1999) 520–542,...
The paper analyzes a model in surface growth where the uniqueness of weak solutions seems to be out ...
The paper analyzes a model in surface growth where the uniqueness of weak solutions seems to be out ...
The paper analyses a model in surface growth, where uniqueness of weak solutions seems to be out of ...
The paper analyses a model in surface growth, where uniqueness of weak solutions seems to be out of ...
We consider the stochastic thin-film equation with colored Gaussian Stratonovich noise in one space ...