Arboreal Objects and Their Homotopy Theory

Abstract

We construct a category as an arboreal extension of epi⊂eq, whose morphisms are ordered forests composed by grafting. We define a full functor π epiop extracting the semisimplicial shadow. For every complete category C, this induces a fully faithful functor from semisimplicial objects in C to C-valued presheaves on , with right adjoint given by right Kan extension. We show that if weak equivalences of arboreal objects are detected by this right adjoint, then their Gabriel--Zisman localization is equivalent to that of semisimplicial objects. For bicomplete cofibrantly generated model categories, under the usual acyclicity hypothesis for right-induced transfer, the corresponding model structure on arboreal objects is Quillen equivalent to the Reedy model structure on semisimplicial objects.

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