Q-Vandermonde identity

Q-Vandermonde identity

In mathematics, in the field of combinatorics, the q-Vandermonde identity is the q-analogue of the Chu-Vandermonde identity

: $egin{bmatrix}m + n\kend{bmatrix}_q=sum_{j} egin{bmatrix}m\k - jend{bmatrix}_qegin{bmatrix}n\jend{bmatrix}_qq^{j(m-k+j)}.$

The proof follows from observing the q-binomial identity with "q"-commuting operators (namely "BA" = "qAB").

Other conventions

In the conventions common in applications to quantum groups, where the q-binomial is symmetric under exchanging $q$ and $q^{-1}$ , the q-Vandermonde identity reads: $egin{bmatrix}m + n\kend{bmatrix}_q=q^{m k}sum_{j=0}^{n}q^{-(m+n)j} egin{bmatrix}m\k - jend{bmatrix}_qegin{bmatrix}n\jend{bmatrix}_q.$

Proof

Assume that "A" and "B" are operators that "q"-commute:

: $BA = qAB.,$

Then:

: $(A + B)^m(A + B)^n ,$

: $= left(sum_{i=0}^megin{bmatrix}m\iend{bmatrix}_{q}A^{i}B^{m-i}
ight)left(sum_{j=0}^negin{bmatrix}n\jend{bmatrix}_{q}A^{j}B^{n-j}
ight)$

:: $= sum_{i,j}egin{bmatrix}m\iend{bmatrix}_qegin{bmatrix}n\jend{bmatrix}_{q}A^{i}B^{m-i}A^{j}B^{n-j}$

:: $= sum_{i,j}egin{bmatrix}m\iend{bmatrix}_qegin{bmatrix}n\jend{bmatrix}_{q}q^{j(m-i)}A^{i+j}B^{m+n-i-j}.$

This makes use of the fact that

$BA^2 = BAA = qABA = q^2AAB = q^2A^2B. ,$

Now, consider the coefficient of $A^{k}B^{m+n-k},$ in this expression. This gives

$sum_{j}egin{bmatrix}m\k-jend{bmatrix}_qegin{bmatrix}n\jend{bmatrix}_{q}q^{j(m-k+j)}.$

Now, from the q-binomial theory, we recognize that $(A+B)^m(A+B)^n=(A+B)^{m+n},$ And thus, the coefficient of $A^{k}B^{m+n-k},$ is

$egin{bmatrix}m+n\kend{bmatrix}_q.$

Combining the results gives: $egin{bmatrix}m + n\kend{bmatrix}_q=sum_{j} egin{bmatrix}m\k - jend{bmatrix}_qegin{bmatrix}n\jend{bmatrix}_qq^{j(m-k+j)}.$

$mathrm{QED},$

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