Co-t-structures: The First Decade
Abstract
Co-t-structures were introduced about ten years ago as a type of mirror image of t-structures. Like t-structures, they permit to divide an object in a triangulated category T into a "left part" and a "right part", but there are crucial differences. For instance, a bounded t-structure gives rise to an abelian subcategory of T, while a bounded co-t-structure gives rise to a so-called silting subcategory. This brief survey will emphasise three philosophical points. First, bounded t-structures are akin to the canonical example of "soft" truncation of complexes in the derived category. Secondly, bounded co-t-structures are akin to the canonical example of "hard" truncation of complexes in the homotopy category. Thirdly, a triangulated category T may be skewed towards t-structures or co-t-structures, in the sense that one type of structure is more useful than the other for studying T. In particular, we think of derived categories as skewed towards t-structures, and of homotopy categories as skewed towards co-t-structures.
Cite
@article{arxiv.1603.09379,
title = {Co-t-structures: The First Decade},
author = {Peter Jorgensen},
journal= {arXiv preprint arXiv:1603.09379},
year = {2016}
}
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12 pages