This article relies largely or entirely on a
single source. (April 2024) |
A discontinuous group is a mathematical concept relating to mappings in topological space.
Let be a topological space of points , and let , , be an open continuous representation of the topological group as a transitive group of homeomorphic mappings of on itself. The representation of the discrete subgroup in is called discontinuous, if no sequence () converges to a point in , as runs over distinct elements of . [1]
This article relies largely or entirely on a
single source. (April 2024) |
A discontinuous group is a mathematical concept relating to mappings in topological space.
Let be a topological space of points , and let , , be an open continuous representation of the topological group as a transitive group of homeomorphic mappings of on itself. The representation of the discrete subgroup in is called discontinuous, if no sequence () converges to a point in , as runs over distinct elements of . [1]