Optimal transport on gas networks
Abstract
This paper models gas networks as metric graphs, with isothermal Euler equations at the edges, Kirchhoff's law at interior vertices and time-(in)dependent boundary conditions at boundary vertices. For this setup, a generalized p-Wasserstein metric in a dynamic formulation is introduced and utilized to derive p-Wasserstein gradient flows, specifically focusing on the non-standard case p = 3.
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