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We explain how to interpret the complexes arising in the "classical" homology stability argument (e.g. in the framework of Randal-Williams-Wahl) in terms of higher algebra, which leads to a new proof of homological stability in this setting.The key ingredient is a theorem of Damiolini on the contractibility of certain arc complexes.We also explain how to directly compare the connectivities of these complexes with that of the "splitting complexes" of Galatius-Kupers-Randal-Williams.
Oscar Randal‐Williams (Fri,) studied this question.
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