hyperorder

Hyperorder is a concept in mathematics and theoretical computer science that refers to the study of the structure and properties of infinite-dimensional spaces. It was introduced by Vladimir Voevodsky in the early 2000s as a way to understand the homotopy theory of higher-dimensional spaces, which are spaces that have a rich structure of higher-dimensional shapes and holes.

In traditional topology, spaces are studied using continuous maps and homotopies, which are ways of deforming

A higher homotopy groupoid is a category whose objects are points in the space and whose morphisms

One of the key applications of hyperorder is in the study of higher-dimensional algebraic geometry, where it