Thick tensor ideals of right bounded derived categories

Abstract

Let R be a commutative noetherian ring. Denote by D-(R) the derived category of cochain complexes X of finitely generated R-modules with Hi(X)=0 for i0. Then D-(R) has the structure of a tensor triangulated category with tensor product -RL- and unit object R. In this paper, we study thick tensor ideals of D-(R), i.e., thick subcategories closed under the tensor action by each object in D-(R), and investigate the Balmer spectrum Spc\,D-(R) of D-(R), i.e., the set of prime thick tensor ideals of D-(R). First, we give a complete classification of the thick tensor ideals of D-(R) generated by bounded complexes, establishing a generalized version of the Hopkins-Neeman smash nilpotence theorem. Then, we define a pair of maps between the Balmer spectrum Spc\,D-(R) and the Zariski spectrum Spec\,R, and study their topological properties. After that, we compare several classes of thick tensor ideals of D-(R), relating them to specialization-closed subsets of Spec\,R and Thomason subsets of Spc\,D-(R), and construct a counterexample to a conjecture of Balmer. Finally, we explore thick tensor ideals of D-(R) in the case where R is a discrete valuation ring.