Proof of Nuprl Lemma : det-fun-is-determinant

Step * 2 1 1 1 2 1 2 of Lemma det-fun-is-determinant

1. r : CRng
2. n : ℤ
3. ¬n < 1
4. 0 < n
5. d : det-fun(r;n)
6. M : Matrix(n;n;r)

7. (d M) = (Σ(r) 0 ≤ i < n. M[0,i] * (d matrix(if x=0 then if y=i then 1 else 0 else M[x,y]))) ∈ |r|

8. i : ℕn
9. ∀j:ℕ

     ((d matrix(if x=0 then if y=i then 1 else 0 else if (j) < (x)  then if y=i then 0 else M[x,y]  else M[x,y]))

= (d matrix+(r;i;matrix-minor(0;i;M)))
∈ |r|)

⊢ (d matrix(if x=0 then if y=i then 1 else 0 else M[x,y])) = (d matrix+(r;i;matrix-minor(0;i;M))) ∈ |r|

{ ((InstHyp [⌜n⌝] (-1)⋅ THENA Auto) THEN NthHypEqTrans (-1) THEN RepeatFor 3 (EqCDA) THEN AutoSplit) }

Latex:

Latex:
1. r : CRng 2. n : \mBbbZ{} 3. \mneg{}n < 1 4. 0 < n 5. d : det-fun(r;n) 6. M : Matrix(n;n;r) 7. (d M) = (\mSigma{}(r) 0 \mleq{} i < n. M[0,i] * (d matrix(if x=0 then if y=i then 1 else 0 else M[x,y]))) 8. i : \mBbbN{}n 9. \mforall{}j:\mBbbN{} ((d matrix(if x=0 then if y=i then 1 else 0 else if (j) < (x) then if y=i then 0 else M[x,y] else M[x,y])) = (d matrix+(r;i;matrix-minor(0;i;M)))) \mvdash{} (d matrix(if x=0 then if y=i then 1 else 0 else M[x,y])) = (d matrix+(r;i;matrix-minor(0;i;M))) By Latex: ((InstHyp [\mkleeneopen{}n\mkleeneclose{}] (-1)\mcdot{} THENA Auto) THEN NthHypEqTrans (-1) THEN RepeatFor 3 (EqCDA) THEN AutoSplit) Home Index