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arxiv: 1312.7527 · v2 · pith:KF7SKL4Pnew · submitted 2013-12-29 · 🧮 math.GN

mathcal I^(mathcal K)-Cauchy functions

classification 🧮 math.GN
keywords mathcalcauchyfunctionsnotioncharacterizecompletedefinedivergence
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In this paper we introduce the notion of $\mathcal I^{\mathcal K}$-Cauchy function, where $\mathcal I$ and $\mathcal K$ are ideals on the same set. The $\mathcal I^{\mathcal K}$-Cauchy functions are a generalization of $\mathcal I^*$-Cauchy sequences and $\mathcal I^*$-Cauchy nets. We show how this notion can be used to characterize complete uniform spaces and we study how $\mathcal I^{\mathcal K}$-Cauchy functions and $\mathcal I$-Cauchy functions are related. We also define and study $\mathcal I^{\mathcal K}$-divergence of functions.

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