Lagrangian Transport Through Surfaces in Compressible Flows
Provides a theoretical solution to a known problem (donating region) for compressible flows, with application to microfluidics.
Generalized a Lagrangian framework for exact flux integration from volume-preserving to compressible flows, solving the donating region problem. Demonstrated efficacy on a 2D micromixer mixing problem.
A material-based, i.e., Lagrangian, methodology for exact integration of flux by volume-preserving flows through a surface has been developed recently in [Karrasch, SIAM J. Appl. Math., 76 (2016), pp. 1178-1190]. In the present paper, we first generalize this framework to general compressible flows, thereby solving the donating region problem in full generality. Second, we demonstrate the efficacy of this approach on a slightly idealized version of a classic two-dimensional mixing problem: transport in a cross-channel micromixer, as considered recently in [Balasuriya, SIAM J. Appl. Dyn. Syst., 16 (2017), pp. 1015-1044].