Day convolution for algebraic patterns

Abstract

We characterize the exponentiable objects for a wide range of structures prevalent in ∞-categorical algebra, extending the construction of Day convolution to more general structures than ∞-operads. More precisely, we give a criterion that is both necessary and sufficient for many of these structures encountered in practice, such as (equivariant) ∞-operads and virtual double ∞-categories. We work within the framework of algebraic patterns of Chu-Haugseng that describe these structures in terms of weak Segal fibrations. As part of the proof, we give a new description of weak Segal fibrations in terms of generalized Segal spaces on certain "tree" categories. We also define the "underlying graph" of a weak Segal fibration, extending the notion of the underlying ∞-category for ∞-operads, and explicitly describe the underlying graph of exponential objects in weak Segal fibrations.

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