Semi-infinite

In mathematics, semi-infinite objects are objects which are infinite or unbounded in some but not all possible ways.

In ordered structures and Euclidean spaces

Generally, a semi-infinite set is bounded in one direction, and unbounded in another. For instance, the natural numbers are semi-infinite considered as a subset of the integers; similarly, the intervals [math]\displaystyle{ (c,\infty) }[/math] and [math]\displaystyle{ (-\infty,c) }[/math] and their closed counterparts are semi-infinite subsets of [math]\displaystyle{ \R }[/math] if [math]\displaystyle{ c }[/math] is finite.^[1] Half-spaces and half-lines are sometimes described as semi-infinite regions.

Semi-infinite regions occur frequently in the study of differential equations.^[2][3] For instance, one might study solutions of the heat equation in an idealised semi-infinite metal bar.

A semi-infinite integral is an improper integral over a semi-infinite interval. More generally, objects indexed or parametrised by semi-infinite sets may be described as semi-infinite.^[4]

Most forms of semi-infiniteness are boundedness properties, not cardinality or measure properties: semi-infinite sets are typically infinite in cardinality and measure.

In optimization

Main page: Semi-infinite programming

Many optimization problems involve some set of variables and some set of constraints. A problem is called semi-infinite if one (but not both) of these sets is finite. The study of such problems is known as semi-infinite programming.^[5]

References

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