In mathematics, a dyadic compactum is a Hausdorff topological space that is the continuous image of a product of discrete two-point spaces,[1] and a dyadic space is a topological space with a compactification which is a dyadic compactum.
[2] However, many authors use the term dyadic space with the same meaning as dyadic compactum above.
[3][4][5] Dyadic compacta and spaces satisfy the Suslin condition, and were introduced by Russian mathematician Pavel Alexandrov.
[1] Polyadic spaces are generalisation of dyadic spaces.
[5] This topology-related article is a stub.