Jump diffusion

It has important applications in magnetic reconnection, coronal mass ejections, condensed matter physics, and pattern theory and computational vision.

In crystals, atomic diffusion typically consists of jumps between vacant lattice sites.

Jump diffusion can be studied on a microscopic scale by inelastic neutron scattering and by Mößbauer spectroscopy.

[6] Such models have a range of financial applications from option pricing, to credit risk, to time series forecasting.

Using techniques from pattern theory, a posterior probability model was constructed over the countable union of sample space; this is therefore a hybrid system model, containing the discrete notions of object number along with the continuum notions of shape.