The span-squares adjunction
Abstract
We show a universal property of the span ∞-category that yields a description of functors defined on this category. For this, we view the span construction as a functor from double ∞-categories to ∞-categories, and show that this functor admits a right adjoint defined by the double ∞-categories of squares. Using this adjunction, we obtain new proofs of the equivalences between different models of algebraic K-theory, given by the Q-, the S-, the cobordism model, and the squares construction.
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