A note on equipartition
Abstract
The problem of the existence of an equi-partition of a curve in n has recently been raised in the context of computational geometry. The problem is to show that for a (continuous) curve : [0,1] n and for any positive integer N, there exist points t0=0<t1<...<tN-1<1=tN, such that d((ti-1),(ti))=d((ti),(ti+1)) for all i=1,...,N, where d is a metric or even a semi-metric (a weaker notion) on n. We show here that the existence of such points, in a broader context, is a consequence of Brower's fixed point theorem.
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