Noncommutative tensor triangular geometry: classification via noetherian spectra

Abstract

Given a monoidal triangulated category T with noetherian spectrum, we show that there is an order preserving bijection between the collection of all Thomason subsets of the non-commutative spectrum Spc(T) and the collection of all thick two-sided semiprime ideals of T. This provides an alternative to the hypotheses of Nakano, Vashaw and Yakimov, as well as the recent approach via completely prime ideals of Mallick and Ray. By assuming the spectrum is noetherian, we show that it is indeed a spectral space, and that it is universal among all such spaces classifying the ideals in question.