Spectrum of an abelian category via premonoform objects

Abstract

Let be an abelian category. In this paper, we study (n)PSpec, a topological space formed by equivalence classes derived from an equivalence relation on (noetherian) premonoform objects. We classify torsion classes of via closed subclasses of . We introduce a new topology on and we classify Serre subcategories of A and localizing subcategories of using this topology. If A is a commutative noetherian ring, we show that A is homeomorphic to A. Moreover, there is a one-to-one correspondence between the closed subsets of A and the open subsets of A, the atom spectrum of A. Finally, we explore the relationships between the new subctegories of A and subsets of A introduced in this paper, and the known subcategories of A and subsets of other spectra of A.