Seminar talk, 18 September 2024: Difference between revisions

Speaker: Pavel Bedrikovetsky

Title: Exact solutions and upscaling in conservation law systems

Abstract:
Numerous transport processes in nature and industry are described by ${\displaystyle n\times n}$ conservation law systems ${\displaystyle u_{t}+f(u)_{x}=0}$, ${\displaystyle u=(u^{1},\dots ,u^{n})}$. This corresponds to upper scale, like rock or core scale in porous media, column length in chemical engineering, or multi-block scale in city transport. The micro heterogeneity at lower scales introduces ${\displaystyle x}$- or ${\displaystyle t}$-dependencies into the large-scale conservation law system, like ${\displaystyle f=f(u,x)}$ or ${\displaystyle f(u,t)}$. Often, numerical micro-scale modelling highly exceeds the available computational facilities in terms of calculation time or memory. The problem is a proper upscaling: how to "average" the micro-scale ${\displaystyle x}$-dependent ${\displaystyle f(u,x)}$ to calculate the upper-scale flux ${\displaystyle f(u)}$?

We present general case for ${\displaystyle n=1}$ and several systems for ${\displaystyle n=2}$ and ${\displaystyle 3}$. The key is that the Riemann invariant at the microscale is the "flux" rather than "density". It allows for exact solutions of several 1D problems: "smoothing" of shocks and "sharpening" of rarefaction waves into shocks due to microscale ${\displaystyle x}$- and ${\displaystyle t}$-dependencies, flows in piecewise homogeneous media. It also allows formulating an upscaling algorithm based on the analytical solutions and its invariant properties.

Video
Slides: Moscow_Osja_240918.pdf

References:
f(s,x)_exact_upscaling_240918.pdf