Proof of Nuprl Lemma : perm

Step * 1 1 1 1 of Lemma perm_inverse

1. T : Type
2. p : Perm(T)
3. p
    O inv_perm(p) ∈ Perm(T)
4. InvFuns(T;T;p
                O inv_perm(p).f;p
                                 O inv_perm(p).b)
⊢ p O inv_perm(p) = id_perm() ∈ perm_sig(T)
BY
{ (Unfolds ``comp_perm inv_perm id_perm`` 0 THEN AbReduce 0) }

1
1. T : Type
2. p : Perm(T)
3. p
    O inv_perm(p) ∈ Perm(T)
4. InvFuns(T;T;p
                O inv_perm(p).f;p
                                 O inv_perm(p).b)
⊢ mk_perm(p.f o p.b;p.f o p.b) = mk_perm(Id;Id) ∈ perm_sig(T)

Latex:

Latex:
1. T : Type 2. p : Perm(T) 3. p O inv\_perm(p) \mmember{} Perm(T) 4. InvFuns(T;T;p O inv\_perm(p).f;p O inv\_perm(p).b) \mvdash{} p O inv\_perm(p) = id\_perm() By Latex: (Unfolds ``comp\_perm inv\_perm id\_perm`` 0 THEN AbReduce 0) Home Index