Borsuk-Ulam Theorem
The Borsuk-Ulam theorem states that any continuous function from an n-sphere into Euclidean n-space maps some pair of antipodal points to the same point.
(Two points on a sphere are called antipodal if they sit on directly opposite sides of the sphere's center.)
The case n = 2 is often illustrated by saying that at any moment there is always a pair of antipodal points on the Earth's surface with equal temperature and equal barometric pressure. This assumes that temperature and barometric pressure vary continuously.
The Borsuk-Ulam theorem was first conjectured by Stanislaw Ulam. It was proved by Karol Borsuk in 1933.
References
- K. Borsuk, "Drei Sätze über die n-dimensionale euklidische Sphäre", Fund. Math., 20 (1933), 177-190.
- Jiří Matouek, "Using the Borsuk-Ulam theorem", Springer Verlag, Berlin, 2003. ISBN 3-540-00362-2.
- L. Lyusternik and S. Shnirel'man, "Topological Methods in Variational Problems". Issledowatelskii Institut Matematiki i Mechaniki pri O. M. G. U., Moscow, 1930.
Referenced By
List of algebraic topology topics | List of mathematical topics | List of mathematical topics (A-C) | List of mathematics topics | Mathematical timeline | S. M. Ulam | Stanislaw Marcin Ulam | Stanislaw Ulam | Timeline of mathematics | TopOlogy | Ulam
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