I am learning Coq at school, and I have an assignment to do for home. I have a lemma to proove: If a list contains a zero among its elements, then the product of its elements is 0. I started my code, and I am stuck in a point where I do not know how to go on. I do not know all the commands from Coq, I did a lot of research, but I cannot manage to find my way to the end of the Proof. Here is my code: Require Import List ZArith.
Open Scope Z_scope. Fixpoint contains_zero (l : list Z) := match l with nil => false | a::tl => if Zeq_bool a 0 then true else contains_zero tl end. Fixpoint product (l : list Z) := match l with nil => 1 | a::tl => a * product tl end. Lemma Zmult_integral_r : forall n m, m <> 0 -> m * n = 0 -> n = 0. Proof. intros n m m0; rewrite Zmult_comm; apply Zmult_integral_l. assumption. Qed. Lemma product_contains_zero : forall l, contains_zero l = true -> product l = 0. intros l H.
So, I thought that it would be a good idea to create a function that checks if the list contains a zero, and another one to calculate the product of its elements. I have also found (luckily) a lemma online that prooves that if I have 2 numbers , and I know that one of them is not 0, and their product is 0, then necessarily the other number is 0 (I thought that might help). I thought about doing a proof by induction, but that didn't work out. Any ideas? I know that this is not the place to ask someone to do my work , I AM NOT ASKING THAT, I just need an idea.