论文信息 - Curve-like sets, normal complexity, and representation

Curve-like sets, normal complexity, and representation

Proposes a theory of the complexity of curves that is sufficient to separate those which extend along their length (e,g., in one dimension) from those that cover an area (e.g., 2-D). The theory is based on original results in geometric measure theory, and is applied to the problems of (i) perceptual grouping and (ii) physiological interpretation, of axonal arbors in developing neurons.

Steven W. Zucker | Benoit Dubuc

[1] Jean Serra,et al. Image Analysis and Mathematical Morphology , 1983 .

[2] Claude Tricot,et al. Rectifiable and fractal sets , 1991 .

[3] Steven W. Zucker,et al. Two Stages of Curve Detection Suggest Two Styles of Visual Computation , 1989, Neural Computation.

[4] S Ullman,et al. Three-dimensional object recognition. , 1990, Cold Spring Harbor symposia on quantitative biology.

[5] Kenneth Falconer,et al. Fractal Geometry: Mathematical Foundations and Applications , 1990 .

[6] G. Matheron. Random Sets and Integral Geometry , 1976 .