The properties of the root mean square chiral index of a d-dimensional set of n points, previously investigated for planar sets, are examined for spatial sets. The properties of the root mean squares direct symmetry index, defined as the normalized minimized sum of the n squared distances between the vertices of the d-set and the permuted d-set, are compared to the properties of the chiral index. Some most dissymetric figures are analytically computed. They differ from the most chiral figures, but the most dissymetric 3-tuples and the most chiral 3-tuples have a common remarkable geometric property: the squared lengths of the sides are each equal to three times a squared distance vertex to the mean point.

Publié le : 1999-09-04
Classification:  chirality,  symmetry,  chiral index,  direct symmetry index,  [MATH.MATH-MG]Mathematics [math]/Metric Geometry [math.MG]

@article{hal-02122820,
     author = {Petitjean, Michel},
     title = {On the root mean square quantitative chirality and quantitative symmetry measures},
     journal = {HAL},
     volume = {1999},
     number = {0},
     year = {1999},
     language = {en},
     url = {http://dml.mathdoc.fr/item/hal-02122820}
}

Petitjean, Michel. On the root mean square quantitative chirality and quantitative symmetry measures. HAL, Tome 1999 (1999) no. 0, . http://gdmltest.u-ga.fr/item/hal-02122820/