Convex geometry is the branch of geometry studying convex sets, mainly in Euclidean space. Convex sets occur naturally in many areas of mathematics: computational geometry, convex analysis, discrete geometry, functional analysis, geometry of numbers, integral geometry, linear programming, probability theory, etc. According to the American Mathematical Society Subject Classification 2000, major branches of the mathematical discipline Convex and Discrete Geometry are: General convexity, Polytopes and polyhedra, Discrete geometry. Further classification of General convexity results in the following list:

• axiomatic and generalized convexity

• convex sets without dimension restrictions

• convex sets in topological vector spaces

• convex sets in 2 dimensions (including convex curves)

• convex sets in 3 dimensions (including convex surfaces)

• convex sets in n dimensions (including convex hypersurfaces)
• finite-dimensional Banach spaces

• random convex sets and integral geometry

• approximation by convex sets

• variants of convex sets (star-shaped, (m, n)-convex, etc.)
• Helly-type theorems and geometric transversal theory

• other problems of combinatorial convexity

• length, area, volume

• mixed volumes and related topics

• inequalities and extremum problems

• convex functions and convex programs

• spherical and hyperbolic convexity

The phrase convex geometry is also used in combinatorics as the name for an abstract model of convex sets based on antimatroids.

Historical note

Convex geometry is a relatively young mathematical discipline. Although the first known contributions to convex geometry date back to antiquity and can be traced in the works of Euclid and Archimedes, it became an independent branch of mathematics at the turn of the 19th century, mainly due to the works of Hermann Brunn and Hermann Minkowski in dimensions two and three. A big part of their results was soon generalized to spaces of higher dimensions, and in 1934 T. Bonnesen and W. Fenchel gave a comprehensive survey of convex geometry in Euclidean space Rⁿ. Further development of convex geometry in the 20th century and its relations to numerous mathematical disciplines are summarized in the Handbook of convex geometry edited by P. M. Gruber and J. M. Wills.

References

Expository articles on convex geometry

• K. Ball, An elementary introduction to modern convex geometry, in: Flavors of Geometry, pp. 1--58, Math. Sci. Res. Inst. Publ. Vol. 31, Cambridge Univ. Press, Cambridge, 1997.

• M. Berger, Convexity, Amer. Math. Monthly, Vol. 97 (1990), 650--678.

• P. M. Gruber, Aspects of convexity and its applications, Exposition. Math., Vol. 2 (1984), 47--83.

• V. Klee, What is a convex set? Amer. Math. Monthly, Vol. 78 (1971), 616--631.

Some books on convex geometry

• T. Bonnesen, W. Fenchel, Theorie der konvexen Körper, Julius Springer, Berlin, 1934. English translation: Theory of convex bodies, BCS Associates, Moscow, ID, 1987.

• R. J. Gardner, Geometric tomography, Cambridge University Press, New York, 1995. Second edition: 2006.

• P. M. Gruber, Convex and discrete geometry, Springer-Verlag, New York, 2007.

• P. M. Gruber, J. M. Wills (editors), Handbook of convex geometry. Vol. A. B, North-Holland, Amsterdam, 1993.

• R. Schneider, Convex bodies: the Brunn-Minkowski theory, Cambridge University Press, Cambridge, 1993.

• A. C. Thompson, Minkowski geometry, Cambridge University Press, Cambridge, 1996.

See also

• List of convexity topics

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