primääridekompositioon

Primääridekompositioon, also known as primary decomposition, is a fundamental concept in commutative algebra and algebraic geometry. It deals with the representation of ideals in a ring as an intersection of simpler ideals. Specifically, in a Noetherian ring, any ideal can be expressed as the intersection of a finite number of primary ideals. This decomposition is crucial for understanding the structure of ideals and the geometry of algebraic varieties.

A primary ideal $Q$ in a commutative ring $R$ is defined by the property that if $ab

The primary decomposition of an ideal is not unique in general. However, there are unique aspects associated