[003H] Inverse images

A morphism between toposes induces the inverse image functor.

[003I] Definition

Let $$T$$ be a base type theory. We work in $$T$$ . Let $i:\mathord {\textnormal {\textsf {Level}}}$ , let $X_{1}$ and $X_{2}$ be toposes, and let $f:X_{1}\rightarrow X_{2}$ be a morphism. The inverse image functor

{f}^{*}:\mathcal {S}(X_{2},i)\rightarrow \mathcal {S}(X_{1},i)

is defined by precomposition with

\(f\)