ikketriangulerbare

Ikketriangulerbare refers to topological manifolds that do not admit any triangulation. In other words, such a manifold cannot be given a simplicial complex structure whose underlying space is homeomorphic to the manifold. Triangulability is equivalent to the existence of a piecewise-linear (PL) structure on the manifold, so a non-triangulable manifold lacks any PL structure as well.

A key tool in the study of triangulability is obstruction theory. For topological manifolds of dimension five

Historical and practical significance: it is known that nontriangulable manifolds exist in dimensions five and higher.

In low dimensions (dimension up to three) every topological manifold is triangulable, reflecting a simpler landscape