# The action on identifications of dependent functions ```agda module foundation.action-on-identifications-dependent-functions where ``` <details><summary>Imports</summary> ```agda open import foundation.universe-levels open import foundation-core.dependent-identifications open import foundation-core.identity-types ``` </details> ## Idea Given a dependent function `f : (x : A) → B x` and an [identification](foundation-core.identity-types.md) `p : x = y` in `A`, we cannot directly compare the values `f x` and `f y`, since `f x` is an element of type `B x` while `f y` is an element of type `B y`. However, we can [transport](foundation-core.transport-along-identifications.md) the value `f x` along `p` to obtain an element of type `B y` that is comparable to the value `f y`. In other words, we can consider the type of [dependent identifications](foundation-core.dependent-identifications.md) over `p` from `f x` to `f y`. The **dependent action on identifications** of `f` on `p` is a dependent identification ```text apd f p : dependent-identification B p (f x) (f y). ``` ## Definition ### Functorial action of dependent functions on identity types ```agda apd : {l1 l2 : Level} {A : UU l1} {B : A → UU l2} (f : (x : A) → B x) {x y : A} (p : x = y) → dependent-identification B p (f x) (f y) apd f refl = refl ``` ## See also - [Action of functions on identifications](foundation.action-on-identifications-functions.md) - [Action of functions on higher identifications](foundation.action-on-higher-identifications-functions.md). - [Action of binary functions on identifications](foundation.action-on-identifications-binary-functions.md).