deltatopology

Deltatopology is a branch of mathematics that studies the properties of shapes and spaces that remain invariant under certain transformations, known as delta transformations. These transformations are a generalization of the more familiar topological transformations, such as stretching, twisting, and bending, but they also include operations that change the dimensionality of the space, such as puncturing or adding handles.

The study of deltatopology began in the early 20th century as a way to understand the behavior

One of the key concepts in deltatopology is that of a delta-invariant, which is a property of

Deltatopology is a rich and active area of research, with many open problems and conjectures. One of