Tertiary Ideal
978-613-1-14154-6
6131141541
72
2010-11-06
29.00 €
eng
https://images.our-assets.com/cover/230x230/9786131141546.jpg
https://images.our-assets.com/fullcover/230x230/9786131141546.jpg
https://images.our-assets.com/cover/2000x/9786131141546.jpg
https://images.our-assets.com/fullcover/2000x/9786131141546.jpg
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. In mathematics, a tertiary ideal is an (two-sided) ideal in a (perhaps noncommutative) ring that cannot be expressed as a nontrivial intersection of a right fractional ideal with another ideal. Tertiary ideals generalize primary ideals to the case of noncommutative rings. Although primary decompositions do not exist in general for ideals in noncommutative rings, tertiary decompositions do, at least if the ring is Noetherian. Every primary ideal is tertiary. Tertiary ideals and primary ideals coincide for commutatitve rings.
https://www.morebooks.de/books/es/published_by/betascript-publishing/1/products
Matemáticas
https://www.morebooks.de/store/es/book/tertiary-ideal/isbn/978-613-1-14154-6