accumulation point
limit point
cluster point

A Hausdorff door space has at most one accumulation point.

Every infinite subset of X has a complete accumulation point.

Hence bounded sequences of operators have a weak accumulation point.

Stocks are the accumulations points in a system.

Also, every point of S is either an accumulation point or an isolated point.

Then the set of accumulation points of any trajectory is contained in .

Such a point is called an accumulation point, and any closed apeirogon must have at least one of them.

Amazingly the asymptotic behavior near the accumulation point appeared universal in the sense that the same numerical values would appear.

A topology is completely determined if for every net in X the set of its accumulation points is specified.

Also, has no finite accumulation point.

Suppose y is an accumulation point.

Crowley's Ridge in Arkansas is a natural loess accumulation point.

When formulated for accumulation points of arbitrary metric spaces, the statement becomes equivalent to AC.

Much is known about the accumulation points of S. The smallest of them is the golden ratio.

A T space is perfect if and only if every point of the space is an -accumulation point.

If one chooses an infinite number of distinct points in the unit interval, then there must be some accumulation point in that interval.

Thus, "condensation point" is synonymous with "-accumulation point".

When ordering by set inclusion, the supremum limit is the least upper bound on the set of accumulation points because it contains each of them.

Every point of the Cantor set is also an accumulation point of the complement of the Cantor set.

Hence, the intersection of all F is not empty, and any point in this intersection is an accumulation point of the sequence (x).

Glass under vacuum becomes more sensitive to chips and scratches in its surface, as these form strain accumulation points, so older glass is best avoided if possible.

The set of accumulation points of Gp in is called the limit set of G, and usually denoted .

Space is said to be strongly discrete if every non-isolated point of is the accumulation point of some strongly discrete set.

Note that the same set of points would not have, as an accumulation point, any point of the open unit interval; hence that space cannot be compact.

More recent innovations include heat-sealed (RF welded) seam construction, as an option to stitched seams, which can be potential bacteria accumulation points.