Towards the Nerves of Steel Conjecture

Abstract

Given a local -triangulated category, and a fiber sequence y 1 x, one may ask if there is always a nonzero object z such that either z f or z g is -nilpotent. The claim that this property holds for all local -triangulated categories is equivalent to Balmer's "nerves of steel conjecture" from arXiv:2001.00284. In the present paper, we will see how this property can fail if the category we start with is not rigid, discuss a large class of categories where the property holds, and ultimately prove that the nerves of steel conjecture is equivalent to a stronger form of this property.

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