Fokker–Planck model for x-ray imaging Here we give two complementary derivations of the x-ray Fokker–Planck equation. The first is phenomenolog- ical, based on local conservation of energy in the presence of both coherent and diffusive paraxial x-ray energy transport. The second is a ...
Fokker–Planck model for x-ray imaging Here we give two complementary derivations of the x-ray Fokker–Planck equation. The first is phenomenolog- ical, based on local conservation of energy in the presence of both coherent and diffusive paraxial x-ray energy transport. The second is a ...
The systems and/or methods described herein and/or derivations thereof can be applied in medical imaging applications such as, but not limited to, cardiac CT, animal x-ray imaging, security scanning systems, non-destructive materials analysis or defect detection, machine vision, systems incorporating...