Print Email Facebook Twitter K-th order Hydrodynamic limits Title K-th order Hydrodynamic limits Author van Tol, Berend (TU Delft Electrical Engineering, Mathematics and Computer Science; TU Delft Delft Institute of Applied Mathematics) Contributor Redig, F.H.J. (mentor) Degree granting institution Delft University of Technology Corporate name Delft University of Technology Programme Applied Mathematics Date 2023-08-30 Abstract In this thesis, we study stochastic duality under hydrodynamic scaling in the context of interacting particles on a grid. The approach is inspired and motivated by the relation between duality and local equilibria. We identify duality relations in terms of the expectation of the density field for which the hydrodynamic limit is recovered. This is initially done both for symmetric inclusion and exclusion processes as well as for independent random walkers. We continue with the independent case and generalize to particles that also possess a, possibly scale-dependent, internal energy state. The results in this context assume generator convergence under scaling and are illustrated using run-and-tumble systems. This work also includes examples concerning instances of run-and-tumble processes that do not have convergence on a generator level. Apart from run-and-tumble processes, we examine the effect of reservoirs on the relevant duality relations and macroscopic profiles. The reservoirs are found to correspond with boundary conditions for the macroscopic profile. Subject Interacting Particle SystemsRun-and-Tumble Particleshydrodynamic limitDualityNon-EquilibriumStatistical PhysicsMarkov theory To reference this document use: http://resolver.tudelft.nl/uuid:7ddf82a2-23f0-415e-a257-82457104eb9e Part of collection Student theses Document type master thesis Rights © 2023 Berend van Tol Files PDF master_thesis_final_versi ... rected.pdf 576.61 KB Close viewer /islandora/object/uuid:7ddf82a2-23f0-415e-a257-82457104eb9e/datastream/OBJ/view