Topological dimension

Topological dimension: The topological dimension or covering dimension or Lebesgue covering dimension of a topological space is defined as the smallest integer ${\displaystyle m}$ such that any open cover of the topological space has an open refinement that has order at most ${\displaystyle m+1}$.

Primary subject wiki entry: Topospaces:Topological dimension

Also located at: Wikipedia:Lebesgue covering dimension