Chessboard and level sets of continuous functions
Abstract
We provide the following result and its discrete equivalent: Let f In Rn-1 be a continuous function. Then, there exist a point p ∈ Rn-1 and a compact subset S ⊂ f-1[\p\] which connects some opposite faces of the n-dimensional unit cube In. We give an example that shows it cannot be generalized to path-connected sets. Additionally, we show that a version of the Steinhaus Chessboard Theorem and the Brouwer Fixed Point Theorem are simple consequences of this result.
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