Library Coq.Num.AddProps


Require Export Axioms.

Require Export EqAxioms.

This file contains basic properties of addition with respect to equality

Properties of Addition


Lemma add_x_0 : (x:N)(x+zero)=x.

EAuto 3 with num.

Qed.

Hints Resolve add_x_0 : num.




Lemma add_x_Sy : (x,y:N)(x+(S y))=(S (x+y)).

Intros x y; Apply eq_trans with (S y)+x; EAuto with num.

Qed.




Hints Resolve add_x_Sy : num.




Lemma add_x_Sy_swap : (x,y:N)(x+(S y))=((S x)+y).

EAuto with num.

Qed.

Hints Resolve add_x_Sy_swap : num.




Lemma add_Sx_y_swap : (x,y:N)((S x)+y)=(x+(S y)).

Auto with num.

Qed.

Hints Resolve add_Sx_y_swap : num.




Lemma add_assoc_r : (x,y,z:N)(x+(y+z))=((x+y)+z).

Auto with num.

Qed.

Hints Resolve add_assoc_r : num.




Lemma add_x_y_z_perm : (x,y,z:N)((x+y)+z)=(y+(x+z)).

EAuto with num.

Qed.

Hints Resolve add_x_y_z_perm : num.




Lemma add_x_one_S : (x:N)(x+one)=(S x).

Intros; Apply eq_trans with (x+(S zero)); EAuto with num.

Qed.

Hints Resolve add_x_one_S : num.




Lemma add_one_x_S : (x:N)(one+x)=(S x).

Intros; Apply eq_trans with (x+one); Auto with num.

Qed.

Hints Resolve add_one_x_S : num.