All Segal objects are generalised monads in spans

Abstract

We extend Barwick's and Haugseng's construction of the double ∞-category of spans in a pullback-complete ∞-category C to more general shapes: for a large class of algebraic patterns P, we define a P-monoidal ∞-category of P-shaped spans in C, and we identify P-monads in it with Segal P-objects in C. For the cell pattern op, this recovers a homotopical reformulation of Batanin's original definition of weak ω-categories, and in general can be seen as a variant of the generalised multicategories of Burroni, Hermida, Leinster and Cruttwell-Shulman.