2020 Mathematics Subject Classification: Primary: 54A [MSN][ZBL]
The boundary of a subspace $A$ of a given topological space $X$ is the set of points of $X$ such that every neighbourhood of any point of it contains both points from $A$ and points from the complement $X\setminus A$. Equivalently, the points which are in the interior neither of $A$ nor of $X \setminus A$; the set of points in the closure of $A$ that are not in the interior of $A$.
A subset $A$ is closed if it contains its boundary, and open if it is disjoint from its boundary.
The accepted notations include $\partial A$, $b(A)$, $\mathrm{Fr}(A)$, $\mathrm{Fr}_X(A)$.
Also: a synonym for the border of a manifold, such as the border of a simplex.