Abstract
Over an associative ring we consider a class $\mathbb{X}$ of left modules which is closed under set-indexed coproducts and direct summands. We investigate when the triangulated homotopy category $\mathsf{K}(\mathbb{X})$ is compactly generated, and give a number of examples.
Citation
Henrik Holm. Peter Jørgensen. "Compactly generated homotopy categories." Homology Homotopy Appl. 9 (1) 257 - 274, 2007.
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