International audienceThis paper investigates the form of the boundary conditions (BCs) used in macroscale models of PDEs with coefficients that vary over a small length-scale (microscale). Specifically, we focus on the one-dimensional multilayer diffusion problem, a simple prototype problem where an analytical solution is available. For a given microscale BC (e.g., Dirichlet, Neumann, Robin, etc.) we derive a corrected macroscale BC using the method of volume averaging. For example, our analysis confirms that a Robin BC should be applied on the macroscale if a Dirichlet BC is specified on the microscale. The macroscale field computed using the corrected BCs more accurately captures the averaged microscale field and leads to a reconstructed...
International audienceWe consider diffusion on rough and spatially periodic surfaces. The macroscopi...
Considering the example of interacting Brownian particles we present a linear response derivation of...
Abstract Many multiscale physical scenarios have a spatial domain which is large in some dimensions ...
International audienceThis paper investigates the form of the boundary conditions (BCs) used in macr...
Highlights - We study the boundary conditions (BCs) in a macroscale model of layered diffusion. - A ...
Homogenization and other multiscale modelling techniques empower scientist and engineers to build ef...
Homogenization and other multiscale modelling techniques empower us to build efficient mathematical ...
We study the problem of estimating parameters of the limiting equation of a multiscale diffusion in ...
We discuss efficient macroscale modelling of microscale systems using patch dynamics. This pilot st...
Multiscale modelling methodologies build macroscale models of materials with complicated fine micros...
Developments in dynamical systems theory provides new support for the macroscale modelling of pdes a...
Graduation date: 2015Quantification of macroscale transport phenomenon in microfluidic systems is im...
Abstract. We introduce a new micro-macro decomposition of collisional kinetic equations in the speci...
In this Chapter, starting from the governing equations, describing the transport of momentum, energy...
© 2007 Society for Industrial and Applied MathematicsWe are developing a framework for multiscale co...
International audienceWe consider diffusion on rough and spatially periodic surfaces. The macroscopi...
Considering the example of interacting Brownian particles we present a linear response derivation of...
Abstract Many multiscale physical scenarios have a spatial domain which is large in some dimensions ...
International audienceThis paper investigates the form of the boundary conditions (BCs) used in macr...
Highlights - We study the boundary conditions (BCs) in a macroscale model of layered diffusion. - A ...
Homogenization and other multiscale modelling techniques empower scientist and engineers to build ef...
Homogenization and other multiscale modelling techniques empower us to build efficient mathematical ...
We study the problem of estimating parameters of the limiting equation of a multiscale diffusion in ...
We discuss efficient macroscale modelling of microscale systems using patch dynamics. This pilot st...
Multiscale modelling methodologies build macroscale models of materials with complicated fine micros...
Developments in dynamical systems theory provides new support for the macroscale modelling of pdes a...
Graduation date: 2015Quantification of macroscale transport phenomenon in microfluidic systems is im...
Abstract. We introduce a new micro-macro decomposition of collisional kinetic equations in the speci...
In this Chapter, starting from the governing equations, describing the transport of momentum, energy...
© 2007 Society for Industrial and Applied MathematicsWe are developing a framework for multiscale co...
International audienceWe consider diffusion on rough and spatially periodic surfaces. The macroscopi...
Considering the example of interacting Brownian particles we present a linear response derivation of...
Abstract Many multiscale physical scenarios have a spatial domain which is large in some dimensions ...