Suppose $d$ is a constant $< n^2$, and $m > n$. I have a kind of factorial function where I subtract $d$ from each *pair* of terms.

Is there any simple upper bound on
$$
P = ( m (m-1) - d) \times ( (m-2) (m-3) - d ) \times \cdots \times \times ((n+1) n - d)
$$

I only need an polynomially tight upper bound. If it makes it easier, you can assume $m = cn$
 for $c$ close to 2.

The best I can come up with is
$$
P \leq \Bigl( \frac{m (m-1) - d}{m (m-1)} \Bigr)^{(m-n)/2} m!/n!
$$
but I don't think this is tight.

Thanks!

EDIT: Previous version incorrectly stated "exponentially tight" vs "polynomially tight"