Proof of Nuprl Lemma : det-transpose

Step * 1 of Lemma det-transpose

.....assertion.....
1. r : CRng
2. n : ℕ
3. M : Matrix(n;n;r)
4. |M|
= Σ{r} f ∈ permutations-list(n). let k = Π(r) 0
                                              ≤ i
                                              < n
                                          M[i,inv(f) i] in

                                     if permutation-sign(n;inv(f))=1 then k else (-r k)

∈ |r|
⊢ Σ{r} f ∈ permutations-list(n). let k = Π(r) 0
                                              ≤ i
                                              < n
                                          M[i,inv(f) i] in

                                     if permutation-sign(n;inv(f))=1 then k else (-r k)

= |M'|
∈ |r|
BY
{ (Unfold `matrix-det` 0 THEN EqCDA) }

1
.....subterm..... T:t
3:n
1. r : CRng
2. n : ℕ
3. M : Matrix(n;n;r)
4. |M|
= Σ{r} f ∈ permutations-list(n). let k = Π(r) 0
                                              ≤ i
                                              < n
                                          M[i,inv(f) i] in

                                     if permutation-sign(n;inv(f))=1 then k else (-r k)

∈ |r|
5. f : ℕn →⟶ ℕn
⊢ let k = Π(r) 0
               ≤ i
               < n
           M[i,inv(f) i] in
      if permutation-sign(n;inv(f))=1 then k else (-r k)
= let k = Π(r) 0
               ≤ i
               < n
           M'[i,f i] in
      if permutation-sign(n;f)=1 then k else (-r k)
∈ |r|

Latex:

Latex:
.....assertion..... 1. r : CRng 2. n : \mBbbN{} 3. M : Matrix(n;n;r) 4. |M| = \mSigma{}\{r\} f \mmember{} permutations-list(n). let k = \mPi{}(r) 0 \mleq{} i < n M[i,inv(f) i] in if permutation-sign(n;inv(f))=1 then k else (-r k) \mvdash{} \mSigma{}\{r\} f \mmember{} permutations-list(n). let k = \mPi{}(r) 0 \mleq{} i < n M[i,inv(f) i] in if permutation-sign(n;inv(f))=1 then k else (-r k) = |M'| By Latex: (Unfold `matrix-det` 0 THEN EqCDA) Home Index