kohomologian

Kohomologian is a concept in mathematics, particularly in algebraic topology and abstract algebra, that provides a way to measure and distinguish topological spaces or algebraic structures. It is a generalization of homology theory and is often considered more flexible and powerful. The core idea is to associate a sequence of algebraic objects, usually abelian groups or modules, to a given topological space or algebraic structure. These sequences are called cohomology groups or rings.

In algebraic topology, cohomology is constructed by considering cochains, which are functions from chains to a

Cohomology has various important properties. It satisfies a universal coefficient theorem, which relates it to homology.