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I was wondering if anyone knew any applications of quasi-continuous functions? i.e. why does anyone care about them?
:Only time I have seen it used was in Koliha's "Metrics, Norms and Integrals". He shows that all Quasicontinuous functions from a Real interval to the complex plane are Lebesque integrable. [[Special:Contributions/58.109.86.193|58.109.86.193]] ([[User talk:58.109.86.193|talk]]) 06:16, 5 September 2009 (UTC)
:It would be worth explaining this in article, but to do so I should go through some references I have on this topic. But as far as I know, one of the motivation for the introduction of this notion was the following: If a function <math>f:\mathbb R\times \mathbb R \to \mathbb R</math> is separately continuous (i.e., if we fix one variable, we get a continuous function in the second variable), it is not continuous in general. But the similar property is true for quasi-continuity. --[[User:Kompik|Kompik]] ([[User talk:Kompik|talk]]) 07:53, 8 October 2011 (UTC)
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