Definition:Bounded Above/Ordered Set
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Definition
Let $\left({S, \preceq}\right)$ be a poset.
A subset $T \subseteq S$ is bounded above (in $S$) if:
- $\exists M \in S: \forall a \in T: a \preceq M$
That is, there is an element of $S$ (at least one) that succeeds all the elements in $T$.
If there is no such element, then $T$ is unbounded above (in $S$).
Also see
Sources
- James M. Hyslop: Infinite Series (1942): $\S 3$
- Seth Warner: Modern Algebra (1965)... (previous)... (next): $\S 14$
- W.A. Sutherland: Introduction to Metric and Topological Spaces (1975): $\S 1.1$
- K.G. Binmore: Mathematical Analysis: A Straightforward Approach (1977)... (previous)... (next): $\S 2.2$
- Thomas A. Whitelaw: An Introduction to Abstract Algebra (1978)... (previous)... (next): $\S 10$
