- E32
[2B2]Suppose that on the set \(X\) there is a relation \(R\) that is reflexive and transitive and satisfies
\begin{equation} \label{eq:ord_ diretto_ R} β x,yβ X ~ β zβ X,~ xRz, yR z\quad . \end{equation}33(as seen in [(3.96)])
This pair \((X,R)\) is a "Directed Set" according to the usual definition (see [ 17 ] or other references in [ 43 ] ).
Show that there exists another relation \(β€\) such that
\(β€\) is a partial order and it satisfies [(3.96)];
\(R\) extends \(β€\) that is;
\[ β x,yβ X ~ xβ€ yβ~ x R y\quad ; \]moreover \((X,β€)\) is cofinal in \((X,R)\).
Solution 1
EDB β 2B2
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English
Authors:
"Mennucci , Andrea C. G."
.
Bibliography
Book index
- [17] J.L. Kelley. General Topology. Graduate Texts in Mathematics. Springer New York, 1975. ISBN 9780387901251. URL https://books.google.it/books?id=-goleb9Ov3oC.
- [43] to3em. Directed set β Wikipedia, the free encyclopedia, 2022. URL https://en.wikipedia.org/w/index.php?title=Directed_set&oldid=1103032969. [Online; accessed 25-novembre-2022].
Book index
- order, directed
- order, with filtering property
- order
- directed set
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