nonfoliation

Nonfoliation refers to a property of certain mathematical objects, particularly in differential geometry and topology. A space is considered nonfoliated if it cannot be decomposed into a collection of smooth, parallel submanifolds. More formally, it relates to the absence of a foliation structure. A foliation divides a manifold into a set of "leaves," which are immersed submanifolds, such that locally the foliation looks like a stack of hyperplanes. If such a structure cannot be consistently defined across the entire manifold, then the manifold is nonfoliated.

The concept of nonfoliation is often discussed in contrast to the existence of foliations. For instance, many