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In summary, a set of the real numbers is an interval, if and only if it is an open interval, a closed interval, or a half-open interval. [4] [5] A degenerate interval is any set consisting of a single real number (i.e., an interval of the form [a, a]). [6] Some authors include the empty set in this definition.
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The closed interval [a,b]. The section of the number line between two numbers is called an interval. If the section includes both numbers it is said to be a closed interval, while if it excludes both numbers it is called an open interval. If it includes one of the numbers but not the other one, it is called a half-open interval.
In mathematics, the unit interval is the closed interval [0,1], that is, the set of all real numbers that are greater than or equal to 0 and less than or equal to 1. It is often denoted I (capital letter I). In addition to its role in real analysis, the unit interval is used to study homotopy theory in the field of topology.
The open-closed template wraps its argument in a left round bracket, right square bracket. These are used to delimit an open-closed interval in mathematics, that is one which doesn't include the start point but does include the end point. The template uses {} to ensure there is no line break in the expression and the Greek characters look better.
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The closed-open template wraps its argument in a left square bracket, right round bracket. These are used to delimit a closed-open interval in mathematics, that is one which includes the start point but does not include the end point. The template uses {} to ensure there is no line break in the expression and Greek characters look better.
The lower limit topology is finer (has more open sets) than the standard topology on the real numbers (which is generated by the open intervals). The reason is that every open interval can be written as a (countably infinite) union of half-open intervals. For any real and , the interval [,) is clopen in (i.e., both open and closed).