A note on antichains in the continuous cube
Abstract
It is well-known that an antichain in the poset [0,1]n must have measure zero. Engel, Mitsis, Pelekis and Reiher showed that in fact it must have (n-1)-dimensional Hausdorff measure at most n, and they conjectured that this bound can be attained. In this note we show that, for every n, such an antichain does indeed exist.
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