| Some definitions of interest. |
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compose | Def (f o g)(x) == f(g(x)) |
| | Thm* A,B,C:Type, f:(BC), g:(AB). f o g AC |
| | Thm* A,B,C:Type, f:(B inj C), g:(A inj B). f o g A inj C |
| | Thm* f:(B onto C), g:(A onto B). f o g A onto C |
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inv_funs_2 | Def InvFuns(A;B;f;g) == (x:A. g(f(x)) = x) & (y:B. f(g(y)) = y) |
| | Thm* f:(AB), g:(BA). InvFuns(A;B;f;g) Prop |
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surjection_type | Def A onto B == {f:(AB)| Surj(A; B; f) } |
| | Thm* A,B:Type. A onto B Type |
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surject | Def Surj(A; B; f) == b:B. a:A. f(a) = b |
| | Thm* A,B:Type, f:(AB). Surj(A; B; f) Prop |