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There is a page named "Radon's theorem" on Wikipedia
- In geometry, Radon's theorem on convex sets, published by Johann Radon in 1921, states that: Any set of d + 2 points in Rd can be partitioned into two...17 KB (2,323 words) - 00:55, 28 April 2024
- In mathematics, the Radon–Nikodym theorem is a result in measure theory that expresses the relationship between two measures defined on the same measurable...23 KB (3,596 words) - 08:59, 4 June 2024
- nonempty intersection. We prove the finite version, using Radon's theorem as in the proof by Radon (1921). The infinite version then follows by the finite...9 KB (922 words) - 07:10, 19 June 2023
- reconstruction); Radon's theorem, that d + 2 points in d dimensions may always be partitioned into two subsets with intersecting convex hulls; the Radon–Hurwitz...6 KB (574 words) - 16:04, 2 December 2023
- from this theorem is known as a Tverberg partition. The special case r = 2 was proved earlier by Radon, and it is known as Radon's theorem. The case d = 1...7 KB (943 words) - 05:29, 24 March 2024
- analysis) Rado's theorem (harmonic analysis) Radon's theorem (convex sets) Radon–Nikodym theorem (measure theory) Raikov's theorem (probability) Ramanujam...73 KB (5,996 words) - 17:15, 5 May 2024
- theorem, Carathéodory's theorem, and Radon's theorem all postdate Kirchberger's theorem. A strengthened version of Kirchberger's theorem fixes one of the given...8 KB (902 words) - 18:43, 27 November 2023
- Hurwitz-Radon theorem)classical problem of differential topology, beginning with the hairy ball theorem, and early work on the classification of division algebras. Specifically...5 KB (646 words) - 11:04, 13 July 2023Holomorphically convex hull Integrally-convex set John ellipsoid Pseudoconvexity Radon's theorem Shapley–Folkman lemma Symmetric set Morris, Carla C.; Stark, Robert...25 KB (3,037 words) - 14:19, 28 January 2024
- Helly's theorem Kirchberger's theorem N-dimensional polyhedron Radon's theorem, and its generalization Tverberg's theorem Krein–Milman theorem Choquet...14 KB (2,153 words) - 19:20, 27 June 2024
- In probability theory and statistics, Bayes' theorem (alternatively Bayes' law or Bayes' rule), named after Thomas Bayes, describes the probability of...54 KB (7,774 words) - 00:42, 22 June 2024
- Kampen–Flores theorem on embeddability of skeletons of simplices into lower-dimensional Euclidean spaces, and topological and multicolored variants of Radon's theorem...5 KB (530 words) - 22:33, 8 May 2023
- Hurwitz problem (section The Hurwitz–Radon theorem)1 , n , n ) {\displaystyle \;(1,n,n)\;} is admissible. The Hurwitz–Radon theorem states that ( ρ ( n ) , n , n ) {\displaystyle \;\left(\rho (n),n,n\right)\;}...4 KB (573 words) - 19:56, 23 December 2021
- analysis and convex analysis Helly's theorem – Theorem about the intersections of d-dimensional convex sets Radon's theorem – Says d+2 points in d dimensions...20 KB (2,953 words) - 10:28, 18 December 2023
- the Radon transform. Cauchy–Crofton theorem is a closely related formula for computing the length of curves in space. Fast Fourier transform Radon 1917...24 KB (3,492 words) - 18:00, 23 June 2024
- Russo–Dye theorem describes the convex hulls of unitary elements in a C*-algebra. In discrete geometry, both Radon's theorem and Tverberg's theorem concern...61 KB (7,148 words) - 16:58, 27 June 2024
- Hille's theorem)Mathematical Society. doi:10.1090/surv/015. (See Theorem II.2.6) Bárcenas, Diómedes (2003). "The Radon–Nikodym Theorem for Reflexive Banach Spaces" (PDF). Divulgaciones...11 KB (1,730 words) - 05:56, 11 May 2024
- can be shattered). However, no set of 4 points can be shattered: by Radon's theorem, any four points can be partitioned into two subsets with intersecting...17 KB (2,769 words) - 17:33, 7 June 2024
- generalization of Choi's theorem is known as Belavkin's "Radon–Nikodym" theorem for completely positive maps. Choi's theorem. Let Φ : C n × n → C m ×...8 KB (1,404 words) - 06:33, 3 November 2022
- tool for understanding the behaviour of polynomials over local fields Radon's theorem - on convex sets, that any set of d + 2 points in Rd can be partitioned...8 KB (1,173 words) - 23:55, 16 April 2024
- Published by Johann Radon in 1921. Radon's theorem (geometry) A theorem on convex sets, stating that any set of d + 2 points in Rd can be partitioned
- the 2D plane corresponds to a slice in the 3D volume and is based on Radon's theorem. It is possible to obtain a 3D volume, get the 2D projection, subsequently