Networked materials and micro-architectured systems gain increasingly importance in multi-scale physics and engineering sciences. Typically, computational intractable microscopic models have to be applied to capture the physical processes and numerous transmission conditions at singularities, interfaces and borders. The topology of the periodic microstructure governs the effective behaviour of such networked systems. A mathematical concept for the analysis of microscopic models on extremely large periodic networks is developed. We consider microscopic models for diffusion-advection-reaction systems in variational form on periodic manifolds. The global characteristics are identified by a homogenization approach for singularly perturbed netwo...
We consider a diffusion process with coefficients that are periodic outside of an “interface region”...
Inspired by continuum mechanical contact problems with geological fault networks, we consider ellipt...
The main objective of this work is the application of variational concepts to microscopic multiple p...
Boundary value problems on large periodic networks arise in many applications such as soil mechanics...
In modern material sciences and multi-scale physics homogenization approaches provide a global chara...
This work studies the homogenization of diffusion processes on scale-free metric graphs, using weak...
this paper, rather than viewing periodicity and sparseness as obstacles to be overcome, we exploit t...
In this thesis we study the homogenization of diffusions in two particular comb-like structures. In ...
This thesis is concerned with extensions and applications of the theory of periodic unfolding in the...
In this paper, we consider the homogenization problem for a steady-state heat conduction problem in ...
We aim at understanding transport in porous materials including regions with both high and low diffu...
We study the question of periodic homogenization of a variably scaled reaction-diffusion problem wit...
We consider a diffusion process with coefficients that are periodic outside of an ‘interface region’...
Abstract We present a variational framework for the computational homogenization of chemo-mechanical...
This mini-course addresses graduate students and young researchers in mathematics and engineering sc...
We consider a diffusion process with coefficients that are periodic outside of an “interface region”...
Inspired by continuum mechanical contact problems with geological fault networks, we consider ellipt...
The main objective of this work is the application of variational concepts to microscopic multiple p...
Boundary value problems on large periodic networks arise in many applications such as soil mechanics...
In modern material sciences and multi-scale physics homogenization approaches provide a global chara...
This work studies the homogenization of diffusion processes on scale-free metric graphs, using weak...
this paper, rather than viewing periodicity and sparseness as obstacles to be overcome, we exploit t...
In this thesis we study the homogenization of diffusions in two particular comb-like structures. In ...
This thesis is concerned with extensions and applications of the theory of periodic unfolding in the...
In this paper, we consider the homogenization problem for a steady-state heat conduction problem in ...
We aim at understanding transport in porous materials including regions with both high and low diffu...
We study the question of periodic homogenization of a variably scaled reaction-diffusion problem wit...
We consider a diffusion process with coefficients that are periodic outside of an ‘interface region’...
Abstract We present a variational framework for the computational homogenization of chemo-mechanical...
This mini-course addresses graduate students and young researchers in mathematics and engineering sc...
We consider a diffusion process with coefficients that are periodic outside of an “interface region”...
Inspired by continuum mechanical contact problems with geological fault networks, we consider ellipt...
The main objective of this work is the application of variational concepts to microscopic multiple p...