The classical theory of affine connections.

Auer, J. W. (Jan W.)

January 1966

No description available.

Geometry, Differential

Parallels (Geometry)

Euclid's parallel postulate its nature, validity, and place in geometrical systems ...

Withers, John William,

January 1905

Thesis (Ph. D.)--Yale University, 1904. / Bibliography: p. [175]-192.

Euclid's parallel postulate its nature, validity, and place in geometrical systems .. /

Withers, John William,

January 1905

Thesis (Ph.D.)--Yale University, 1904. / Bibliography: p. [175]-192.

The classical theory of affine connections.

Auer, J. W.

January 1966

The theory of affine connections is, roughly speaking, a generalization of certain concepts of parallelism and differentiation defined in plane differential geometry, to the differential geometry of surfaces, and, more generally, to the geometry of differentiable manifolds. It is the purpose of this essay to relate the various stages of this generalization, and to present the essentials of the classical theory of affine connections on a differentiable manifold. [...]

Mathematics.

Geometry, Differential.

Parallels (Geometry).

The classical theory of affine connections.

Auer, J. W.

January 1966

No description available.

Mathematics.

Parallels (Geometry).

Geometry, Differential.

Lobachevski illuminated content, methods, and context of The theory of parallels /

Braver, Seth Philip.

January 2007

Thesis (Ph. D.)--University of Montana, 2007. / Title from title screen. Description based on contents viewed July 19, 2007. Includes German text: Geometrische Untersuchungen zur Theorie der Parallellinien / von Nicolaus Lobatschewsky. Includes bibliographical references (p. 279-282).

Differential geometry of surfaces and minimal surfaces

Duran, James Joseph

01 January 1997

No description available.

Differential Geometry

Analytic Geometry

Geodesics (Mathematics)

Jordan curves

Euclid's Elements

Parallels (Geometry)

Algebraic Geometry