Relative geometry
The geometry of a configuration composed of two surfaces and that are in Peterson correspondence. The analogy between this correspondence and the spherical map makes it possible to introduce the concepts of a relative area, Gaussian and mean curvature, etc., and in particular of a relatively-minimal surface (see [1]).
An examination of the derivation of the equations for the reference frame , , leads to the concept of the interior relative geometry of a surface (see [2]). This is the geometry of an affine connection (or more precisely, an equi-affine connection) without torsion. The concept of a second-order geometry similar to the geometry of the spherical map has been introduced (see [3]).
Within relative geometry it is possible to include in an overall scheme not only the geometry of Euclidean surfaces and pseudo-Euclidean spaces, but also the geometry of affine differential geometry. The vector of the affine normal is characterized by the fact that the asymptotic net of the surface is a Chebyshev net (see [3]).
A further generalization of relative geometry is the theory of normalized surfaces (see [4]). With each point of a surface in a projective space two straight lines are connected: the first-order normal which passes through a point of the surface but having no other common points with the tangent plane , and the second-order normal belonging to but not passing through . Two interior geometries conjugated through an asymptotic net are defined on . The construction of relative geometries allows many generalizations (see [4]).
References
[1] | E. Müller, Monatsh. Math. und Physik , 31 (1921) pp. 3–19 |
[2] | A.P. Norden, "Sur l'inclusion des théories métriques et affines des surfaces dans la géométrie des systèmes spécifiques" C.R. Acad. Sci. Paris , 192 (1931) pp. 135–137 |
[3] | A.P. Norden, "On the intrinsic geometry of second kind hypersurfaces in affine space" Izv. Vyzov. Mat. , 4 (1958) pp. 172–183 (In Russian) |
[4] | A.P. Norden, "Spaces with an affine connection" , Nauka , Moscow-Leningrad (1976) (In Russian) |
Relative geometry. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Relative_geometry&oldid=48496