Grunnleggende konsepter
This paper establishes a connection between closed subcategories in a Grothendieck category, particularly quotient categories, and specific filter systems within those categories, providing a framework for understanding their structure and relationships.
Sitater
"Closed subcategories are the most direct analogues of closed subschemes in the commutative case."
"Many interesting quasi-schemes, such as the noncommutative projective scheme Qgr-B = Gr-B/ Tors-B associated to a graded algebra B, arise as quotient categories of simpler abelian categories."
"In this paper we develop a framework which will allow one to better understand the spectrum of closed subcategories of a noncommutative projective scheme Qgr-B."