# Equiv string maps (unordered type) to equal string

I want to prove that if string maps (key*value) are Equiv, then the string lists are equal OR convert two Equiv maps to equal strings of key-value pairs.

``````(**defined in FMapInterface*)
Definition Equiv (eq_elt:elt->elt->Prop) m m' :=
(forall k, In k m <-> In k m') /\
(forall k e e', MapsTo k e m -> MapsTo k e' m' -> eq_elt e e').

Definition t (elt:Set) := list (X.t * elt) (**defined in FMapWeakList *).
``````

In my case, X.t and elt are String.string (string map).

``````Definition StringMap_to_strlist (zm : t String.string) : String.string :=
fold (fun k v z => (k ++ v) ::  z) zm "".

Lemma test: forall m m,
Equiv m m -> StringMap_to_strlist m = StringMap_to_strlist m.
``````

For example, for two Equiv string maps m and m',

`````` m    quiv   m'
k1:v1       k1:v1
k3:v1       k2:v2
k2:v2       k3:v1
``````

The correspong lists may be like: `k1++v1::k3++v1::k2++v2 and k1++v1::k2++v2::k3++v1` which are not equal.

I want to prove that if maps are Equiv, then the string lists are equal OR convert two Equiv maps to equal strings of key-value pairs. In my case, the order of key-value pairs in the string is not imporant, so ordering the list is ok, if possible. For the maps, the following list is acceptable in my case.

``````k1++v1::k2++v2::k3++v1 = k1++v1::k2++v2::k3++v1
``````

I dont know how to convert Equiv (unordered type) string maps to equal strings. Please some one help me