Partition of an interval

In mathematics, a partition of an interval $[a, b]$ on the real line is a finite sequence $x 0, x 1, x 2, ..., x k$ of real numbers such that

In other terms, a partition of a compact interval $I$ is a strictly increasing sequence of numbers (belonging to the interval $I$ itself) starting from the initial point of $I$ and arriving at the final point of $I$ .

Every interval of the form $[x i, x i + 1]$ is referred to as a subinterval of the partition x.

Another partition of the given interval, $Q$ , is defined as a refinement of the partition, $P$ , when it contains all the points of $P$ and possibly some other points as well; the partition $Q$ is said to be “finer” than $P$ . Given two partitions, $P$ and $Q$ , one can always form their common refinement, denoted $P \lor Q$ , which consists of all the points of $P$ and $Q$ , re-numbered in order.

The norm (or mesh) of the partition

is the length of the longest of these subintervals, that is

Partitions are used in the theory of the Riemann integral, the Riemann–Stieltjes integral and the regulated integral. Specifically, as finer partitions of a given interval are considered, their mesh approaches zero and the Riemann sum based on a given partition approaches the Riemann integral.

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