# Equivalence of a sequence list

Where the definition of equivalence (`lequiv`) in Color's library: http://color.inria.fr/doc/CoLoR.Util.List.ListUtil.html

``````Require Import List.
Variable A : Type.
Definition lequiv (l1 l2: list A) : Prop := l1 [= l2 /\ l2 [= l1.
Infix "[=]" := lequiv (at level 70).
``````

I would like to proof the lemma below. Here is my proof:

``````Lemma equiv_app_equiv: forall l1 l2 l3 : list A, l1 ++ l2 [=] l3 ->
l1 [=] l3 /\ l2 [=] l3.
Proof.
unfold lequiv in |- *; simpl in |- *. intuition.
apply incl_appr_incl in H0. apply H0.

A : Type
l1 : list A
l2 : list A
l3 : list A
H0 : l1 ++ l2 [=l3
H1 : l3 [=l1 ++ l2
============================
l3 [=l1
``````

at this goal, I don't know how to go further, and I would like to know about the hypothesis `H1: l3 [= l1 ++ l2` can it rewrite to : `l3 [= l1 /\ l3 [= l2`? I do not find any proof about this case in the Coq's library (`List)`.

Could you please help me? do I lack something in my lemma? and is it provable? Thank you very much.

-
From what I could gather `In` is similar to `∈`, `[=` is similar to `⊂`, `[=]` is similar to `=`, and `++` is similar to `∪`.
It's not true that `A ∪ B = C → A = C ∧ B = C`.