advektionsscheman

Advektionsscheman, or advection schemes, are numerical methods used to approximate the advection term in partial differential equations that describe the transport of scalars or vectors by a velocity field. They are central to computational fluid dynamics, meteorology, and oceanography, where quantities such as temperature, humidity, salinity, or pollutant concentration are advected by flows.

In discrete models, advection can be treated in Eulerian form on a fixed grid or in semi-Lagrangian/Lagrangian

Common approaches include first-order upwind schemes, which are robust but diffusive; higher-order linear schemes such as

Key properties include stability criteria such as the CFL condition, accuracy, monotonicity, and the balance between

Advektionsscheman are integral to simulations of atmospheric transport, ocean circulation, pollutant dispersion, and climate modeling, influencing