Nuprl - Some Definitions

Thms relation autom Sections AutomataTheory Doc

NOTE:

i is just a notation for {0..i

}

int_seg Def {i..j} == {k:| i k < j}
Thm* m,n:. {m..n} Type

trans Def basic Trans x,y:T. E(x;y) == a,b,c:T. E(a;b) E(b;c) E(a;c)
Thm* E:(TTProp). Trans x,y:T. E(x,y) Prop

int_upper Def {i...} == {j:| ij}
Thm* n:. {n...} Type

refl Def basic Refl(T;x,y.E(x;y)) == a:T. E(a;a)
Thm* E:(TTProp). Refl(T;x,y.E(x,y)) Prop

sym Def basic Sym x,y:T. E(x;y) == a,b:T. E(a;b) E(b;a)
Thm* E:(TTProp). Sym x,y:T. E(x,y) Prop

lelt Def i j < k == ij & j < k

le Def AB == B < A
Thm* i,j:. ij Prop

not Def A == A False
Thm* (A) Prop

int_seg	`Def {i..j} == {k:\| i k < j}` `Thm* m,n:. {m..n} Type`
trans	`Def basic Trans x,y:T. E(x;y) == a,b,c:T. E(a;b) E(b;c) E(a;c)` `Thm* E:(TTProp). Trans x,y:T. E(x,y) Prop`
int_upper	`Def {i...} == {j:\| ij}` `Thm* n:. {n...} Type`
refl	`Def basic Refl(T;x,y.E(x;y)) == a:T. E(a;a)` `Thm* E:(TTProp). Refl(T;x,y.E(x,y)) Prop`
sym	`Def basic Sym x,y:T. E(x;y) == a,b:T. E(a;b) E(b;a)` `Thm* E:(TTProp). Sym x,y:T. E(x,y) Prop`
lelt	`Def i j < k == ij & j < k`
le	`Def AB == B < A` `Thm* i,j:. ij Prop`
not	`Def A == A False` `Thm* (A) Prop`