A note on Cauchy integrability
Abstract
We show that for any bounded function f:[a,b]→ R and ε>0 there is a partition P of [a,b] with respect to which the Riemann sum of f using right endpoints is within ε of the upper Darboux sum of f. This leads to an elementary proof of the theorem of Gillespie G showing that Cauchy's and Riemann's definitions of integrability coincide.
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