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Line 31: Because the [[Lebesgue measure]] of the [[Uncountable set\|uncountably infinite]] [[Cantor set]] is 0, for any positive ''ε'' < 1 and ''δ'', there exists a finite sequence of [[pairwise disjoint]] sub-intervals with total length < ''δ'' over which the Cantor function cumulatively rises more than ''ε''. In fact, to every ''δ'' > 0 there are finitely many pairwise disjoint intervals (''x<SUB>k</SUB>'',''y<SUB>k</SUB>'') (1 ≤ ''k'' ≤ ''M'') with <math>\sum\limits_{k=1}^~~My_k~~M (y_k-x_k)<\delta</math> and <math>\sum\limits_{k=1}^McM (c(y_k)-c(x_k))=1</math>. == Alternative definitions ==

Cantor function: Difference between revisions