A note on thick subcategories and wide subcategories (Q1689734)

Let \(\mathcal{T}\) be a triangulated category with \(\left( \mathcal{T}^{\leqslant0},\mathcal{T}^{\geqslant0} \right)\) a bounded \(t\)-structure. Let \(\mathcal{A}\) be the heart of the \(t\)-structure and \(H^0\) the cohomology functor from \(\mathcal{T}\) to \(\mathcal{A}\). The authors find a correspondence of complete lattices between the wide subcategories of \(\mathcal{A}\) and the \(H^0\)-stable thick subcategories of \(\mathcal{T}\) (Theorem 2.5). They also prove that for an Artin algebra \(A\), the smallest \(H^0\)-stable thick subcategory of \(D^b\pmod A\) containing \(K^b(\mathrm{proj }A)\) is \(D^b\pmod A\) (Lemma 3.4). After giving some homological properties of Artin algebras for which the subcategories of \(D^b\pmod A\) are \(H^0\)-stable (Property (H)) (Proposition 3.6), they use them to characterize finite-dimensional triangular algebras over an algebraically closed field with this property (H), by means of the no loop conjecture. These algebras turn out to be the hereditary algebras (Theorem 3.7).