Nuprl - Definition Cascade for equiv

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EquivRel _1,_2:A. R(_1;_2) is alpha-equivalent to EquivRel x,y:A. R(x;y).

Who Cites equiv rel?

equiv_rel Def  EquivRel x,y:T. E(x;y)
Def  == Refl(T;x,y.E(x;y)) & (Sym x,y:T. E(x;y)) & (Trans x,y:T. E(x;y))
Thm*  T:Type, E:(TTProp). (EquivRel x,y:T. E(x,y))  Prop

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

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

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

Syntax: EquivRel x,y:T. E(x;y) has structure: equiv_rel(T; x,y.E(x;y))

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WhoCites Definitions LogicSupplement Sections DiscrMathExt Doc

	Who Cites equiv rel?

equiv_rel	Def EquivRel x,y:T. E(x;y) Def == Refl(T;x,y.E(x;y)) & (Sym x,y:T. E(x;y)) & (Trans x,y:T. E(x;y))

	Thm* T:Type, E:(TTProp). (EquivRel x,y:T. E(x,y)) Prop

trans	Def Trans x,y:T. E(x;y) == a,b,c:T. E(a;b) E(b;c) E(a;c)

	Thm* T:Type, E:(TTProp). (Trans x,y:T. E(x,y)) Prop

sym	Def Sym x,y:T. E(x;y) == a,b:T. E(a;b) E(b;a)

	Thm* T:Type, E:(TTProp). (Sym x,y:T. E(x,y)) Prop

refl	Def Refl(T;x,y.E(x;y)) == a:T. E(a;a)

	Thm* T:Type, E:(TTProp). Refl(T;x,y.E(x,y)) Prop