Document 6ffc9680fbe00a58d70cdeb319f11205ed998131ce51bb96f16c7904faf74a3d
Base set
Let Subq : TpArr set TpArr set Prop := Prim 8
Let setprod : TpArr set TpArr set set := Prim 73
Let binrep : TpArr set TpArr set set := Prim 71
Let Power : TpArr set set := Prim 11
Let Empty : set := Prim 9
Let Union : TpArr set set := Prim 10
Let and : TpArr Prop TpArr Prop Prop := Prim 4
Let In : TpArr set TpArr set Prop := Prim 7
Let PNoLe : TpArr set TpArr TpArr set Prop TpArr set TpArr TpArr set Prop Prop := Prim 85
Let not : TpArr Prop Prop := Prim 3
Let atleast5 : TpArr set Prop := Prim 17
Let set_of_pairs : TpArr set Prop := Prim 80
Let exactly4 : TpArr set Prop := Prim 21
Let V_ : TpArr set set := Prim 63
Let atleast4 : TpArr set Prop := Prim 16
Let exactly2 : TpArr set Prop := Prim 19
Let exactly5 : TpArr set Prop := Prim 22
Let nat_p : TpArr set Prop := Prim 58
Let ordinal : TpArr set Prop := Prim 62
Let SetAdjoin : TpArr set TpArr set set := Prim 45
Conj bountyprop : All X0 set Imp Ap Ap Subq X0 Ap Ap setprod Ap Ap binrep Ap Power Ap Ap binrep Ap Power Ap Power Empty Empty Ap Power Empty Empty All X1 set Imp Ap Ap Subq X1 Empty All X2 set Imp Ap Ap Subq X2 Ap Union X0 Ap Ap and All X3 set Imp Ap Ap In X3 X1 All X4 set Ap Ap and Imp Ap Ap Ap Ap PNoLe X3 Lam X5 set Ap Ap and Ap Ap and Ap not Ap atleast5 X4 Ap Ap and Ap set_of_pairs X1 Ap Ap and Ap not Ap exactly4 Ap V_ Empty Ap Ap and Ap Ap and Ap atleast4 X1 Ap exactly2 X4 Ap not Ap exactly4 X2 Ap not Ap atleast4 Ap Ap binrep Ap Power Ap Ap binrep Ap Power Ap Power Empty Empty Ap Power Empty Ap Ap binrep Ap Power Ap Power Ap Power Ap Power Empty Ap Power Ap Power Empty Lam X5 set Ap exactly5 Empty Ap not Ap nat_p X2 Ap atleast5 X3 Imp Ap ordinal Empty Ap ordinal Ap Ap SetAdjoin X1 X0
