Proof of Nuprl Lemma : sym_grp_is_swaps

Step * of Lemma sym_grp_is_swaps_a

∀n:{1...}. ∀p:Sym(n).

  ∃abs:{ab:ℕn × ℕn| fst(ab) < snd(ab)}  List. (p = (Π map(λab.let a,b = ab in txpose_perm(a;b);abs)) ∈ Sym(n))

BY
{ (UnivCD THENA Auto) }

1
1. n : {1...}
2. p : Sym(n)

⊢ ∃abs:{ab:ℕn × ℕn| fst(ab) < snd(ab)}  List. (p = (Π map(λab.let a,b = ab in txpose_perm(a;b);abs)) ∈ Sym(n))

Latex:

Latex:
\mforall{}n:\{1...\}. \mforall{}p:Sym(n). \mexists{}abs:\{ab:\mBbbN{}n \mtimes{} \mBbbN{}n| fst(ab) < snd(ab)\} List. (p = (\mPi{} map(\mlambda{}ab.let a,b = ab in txpose\_perm(a;b);abs))\000C) By Latex: (UnivCD THENA Auto) Home Index