Theorems of Carath\'eodory, Helly, and Tverberg without dimension
Abstract
We prove a no-dimensional version of Carath\'edory's theorem: given an n-element set P⊂ d, a point a ∈ P, and an integer r d, r n, there is a subset Q⊂ P of r elements such that the distance between a and Q is less than P/ 2r. A general no-dimension Helly type result is also proved with colourful and fractional consequences. Similar versions of Tverberg's theorem and some of their extensions are also established.
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