Publication: Adaptive local basis for elliptic problems with L∞-coefficients
Adaptive local basis for elliptic problems with L∞-coefficients
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Weymuth, M. (2016). Adaptive local basis for elliptic problems with L∞-coefficients. (Dissertation, University of Zurich) https://doi.org/10.5167/uzh-127104
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The main goal of this thesis is the development of a new finite element method for the discretization of elliptic partial differential equations in heterogeneous media. The efficient numerical modelling of such problems is of fundamental importance since they arise in many applications such as diffusion in composite materials or porous media. The challenge of modelling heterogeneous materials is that they usually have a complex structure. Often they contain complicated and/or tiny inclusions which are distributed randomly. Hence, the solut
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Weymuth, M. (2016). Adaptive local basis for elliptic problems with L∞-coefficients. (Dissertation, University of Zurich) https://doi.org/10.5167/uzh-127104
