DEFINITION ex4_3_ind()
TYPE =
∀A0:Set
.∀A1:Set
.∀A2:Set
.∀P0:A0→A1→A2→Prop
.∀P1:A0→A1→A2→Prop
.∀P2:A0→A1→A2→Prop
.∀P3:A0→A1→A2→Prop
.∀P:Prop
.(∀a:A0.∀a1:A1.∀a2:A2.(P0 a a1 a2)→(P1 a a1 a2)→(P2 a a1 a2)→(P3 a a1 a2)→P)→(ex4_3 A0 A1 A2 P0 P1 P2 P3)→P
BODY =
assume A0: Set
assume A1: Set
assume A2: Set
assume P0: A0→A1→A2→Prop
assume P1: A0→A1→A2→Prop
assume P2: A0→A1→A2→Prop
assume P3: A0→A1→A2→Prop
assume P: Prop
suppose H: ∀a:A0.∀a1:A1.∀a2:A2.(P0 a a1 a2)→(P1 a a1 a2)→(P2 a a1 a2)→(P3 a a1 a2)→P
suppose H1: ex4_3 A0 A1 A2 P0 P1 P2 P3
by cases on H1 we prove P
case ex4_3_intro a:A0 a1:A1 a2:A2 H2:P0 a a1 a2 H3:P1 a a1 a2 H4:P2 a a1 a2 H5:P3 a a1 a2 ⇒
the thesis becomes P
by (H . . . H2 H3 H4 H5)
P
we proved P
we proved
∀A0:Set
.∀A1:Set
.∀A2:Set
.∀P0:A0→A1→A2→Prop
.∀P1:A0→A1→A2→Prop
.∀P2:A0→A1→A2→Prop
.∀P3:A0→A1→A2→Prop
.∀P:Prop
.(∀a:A0.∀a1:A1.∀a2:A2.(P0 a a1 a2)→(P1 a a1 a2)→(P2 a a1 a2)→(P3 a a1 a2)→P)→(ex4_3 A0 A1 A2 P0 P1 P2 P3)→P