A new stereological principle for test lines in three-dimensional space |
| |
Authors: | L M CRUZ-ORIVE |
| |
Affiliation: | Departamento de Matemáticas, Estadística y Computación, Facultad de Ciencias, Universidad de Cantabria, Avda. Los Castros s/n, E-39005 Santander, Spain |
| |
Abstract: | A new principle is presented to generate isotropic uniform random (IUR) test lines hitting a geometric structure in three-dimensional space (3D). The principle therefore concerns the estimation of surface area, volume, membrane thickness, etc., of arbitrary structures with piecewise smooth boundary. The principle states that a point-sampled test line on an isotropic plane through a fixed point in 3D is effectively an invariant test line in 3D. Particular attention is devoted to the stereology of particles, where an alternative to the surfactor method is obtained to estimate surface area. An interesting case arises when the particle is convex. The methods are illustrated with synthetic examples. |
| |
Keywords: | Convex body Crofton formulae integral geometry invariant probe particle pivotal point pivotal section platelet point-sampled test line stereology support function support set surface area volume weighted mean |
|
|