rightopen

Rightopen refers to a type of interval on the real number line that is closed on the left endpoint and open on the right endpoint. The standard finite example is [a,b) where a < b; the interval contains every x with a ≤ x < b but does not contain b. In this sense it is left-closed, right-open. The term is sometimes used interchangeably with half-open intervals, though exact naming can vary by author.

Rightopen intervals are fundamental in several areas of analysis and topology. They frequently appear in measure

Properties commonly noted for [a,b) include that it is connected (as an interval in the real numbers),

Rightopen intervals also play a role in analysis of functions defined on half-open domains, and they are