In mathematics, more specifically general topology, the rational sequence topology is an example of a topology given to the set R of real numbers.
For each irrational number x take a sequence of rational numbers with the property that converges to x with respect to the Euclidean topology.
The rational sequence topology is specified by letting each rational number singleton to be open, and using as a neighborhood base for each irrational number x, the sets
Un(x)=\{xk:k\gen\}\cup\{x\}.