nLab
pushout-product

Definition

Let $\otimes : ℰ_{1} \times ℰ_{2} \to ℰ_{3}$ be a functor (e.g. a tensor product, tensoring). Let $ℰ_{3}$ have pushouts.

For $f : A \to B$ in $ℰ_{1}$ and $g : X \to Y$ in $ℰ_{2}$ , the pushout product morphism is the morphism

A \otimes Y \underset{A \otimes X}{∐} B \otimes Y \to B \otimes Y

out of the coproduct, induced from the commuting diagram

\begin{matrix} A \otimes X & \to & B \otimes X \\ ↓ & ↓ \\ B \otimes X & \to & B \otimes Y \end{matrix} .

Created on March 23, 2012 08:14:45 by Urs Schreiber (82.172.178.200)