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The classification of 3-dimensional locally strongly convex homogeneous affine hypersurfaces.

Luc Vrancken, Franki Dillen (1993)

Manuscripta mathematica

The convex floating body.

Elisabeth Werner, Carsten Schütt (1990)

Mathematica Scandinavica

The fundamental theorems of curves and hypersurfaces in centro-affine geometry.

Gardner, Robert B., Wilkens, George R. (1997)

Bulletin of the Belgian Mathematical Society - Simon Stevin

The Killing Tensors on an $n$ -dimensional Manifold with $S L (n,)$ -structure

Sergey E. Stepanov, Irina I. Tsyganok, Marina B. Khripunova (2016)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

In this paper we solve the problem of finding integrals of equations determining the Killing tensors on an $n$ -dimensional differentiable manifold $M$ endowed with an equiaffine $S L (n,)$ -structure and discuss possible applications of obtained results in Riemannian geometry.

The Monge-Ampère equation and affine maximal surfaces.

Kozlowski, Michael (1993)

Publications de l'Institut Mathématique. Nouvelle Série

The osculating hyperquadrics of the three-component distribution in affine space

Marina F. Grebenyuk (2001)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

Thomsen Surfaces in Affine 4-Space.

Luc Vrancken (1996)

Monatshefte für Mathematik

Torsion Free Connections, Topology, Geometry and Differential Operators on Smooth Manifolds

Neda Bokan (2000)

Zbornik Radova

Traceless cubic forms on statistical manifolds and Tchebychev geometry

Hiroshi Matsuzoe (2005)

Banach Center Publications

Geometry of traceless cubic forms is studied. It is shown that the traceless part of the cubic form on a statistical manifold determines a conformal-projective equivalence class of statistical manifolds. This conformal-projective equivalence on statistical manifolds is a natural generalization of conformal equivalence on Riemannian manifolds. As an application, Tchebychev type immersions in centroaffine immersions of codimension two are studied.

Translation foliations of codimension one on compact affine manifolds

Francisco Turiel (1997)

Banach Center Publications

Consider two foliations $ℱ_{1}$ and $ℱ_{2}$ , of dimension one and codimension one respectively, on a compact connected affine manifold $(M, \nabla)$ . Suppose that $\nabla_{T ℱ_{1}} T ℱ_{2} \subset T ℱ_{2}$ ; $\nabla_{T ℱ_{2}} T ℱ_{1} \subset T ℱ_{1}$ and $T M = T ℱ_{1} \oplus T ℱ_{2}$ . In this paper we show that either $ℱ_{2}$ is given by a fibration over $S^{1}$ , and then $ℱ_{1}$ has a great degree of freedom, or the trace of $ℱ_{1}$ is given by a few number of types of curves which are completely described. Moreover we prove that $ℱ_{2}$ has a transverse affine structure.

Two-parametric systems of three-dimensional spaces in a unimodular six-dimensional affine space

Josef Srovnal (1986)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

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