Proofgold Proposition

∀ x0 x1 . ∀ x2 x3 : ι → ι → ι . SNo x0 ⟶ SNo x1 ⟶ (∀ x4 . x4 ∈ SNoS_ (SNoLev x0) ⟶ ∀ x5 . SNo x5 ⟶ x2 x4 x5 = x3 x4 x5) ⟶ {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoL x1)} = {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoL x1)} ⟶ {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoR x1)} = {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoR x1)} ⟶ {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoR x1)} = {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoR x1)} ⟶ {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoL x1)} = {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoL x1)} ⟶ SNoCut (binunion {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoL x1)} {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoR x1)}) (binunion {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoR x1)} {add_SNo (x2 (ap x5 0) x1) (add_SNo (x2 x0 (ap x5 1)) (minus_SNo (x2 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoL x1)}) = SNoCut (binunion {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoL x1)} {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoR x1)}) (binunion {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoL x0) (SNoR x1)} {add_SNo (x3 (ap x5 0) x1) (add_SNo (x3 x0 (ap x5 1)) (minus_SNo (x3 (ap x5 0) (ap x5 1))))|x5 ∈ setprod (SNoR x0) (SNoL x1)})

type
prop

theory
HotG

name
-

proof
PURzn..

Megalodon
Conj_mul_SNo_eq__25__3

proofgold address
TMPpy..^{Conj_mul_SNo_eq__25__3}

creator
35045 PrNpY../edbb1..

owner
35047 PrNpY../d3773..

term root
aae1c..