Denote by $\mu_n$ the largest value such that there exists a lattice of determinant $1$ in $\mathbb R^n$ for which the distances between different lattice points are greater or equal to $\mu_n$.
Korkine, Zolotareff, and then Blichfeldt found $\mu_n$ for $n=2,\ldots , 8$ (cf. H.F. Blichfeldt, The minimum value of positive quadratic forms in six, seven, and eight variables. Math. Z. 39 (1935), 1-15, EuDML).
What about $n>8$?
The only other case that is known is n=24: Abhinav Kumar and I solved that case (Optimality and uniqueness of the Leech lattice among lattices, Annals of Mathematics 170 (2009), 1003-1050, doi:10.4007/annals.2009.170.1003, arXiv:math.MG/0403263).
It might be possible to do n=9 using known methods, but it would be an enormous calculation. For the status as of a few years ago, see the end of Mathieu Dutour Sikiric, Achill Schuermann, and Frank Vallentin's paper
This is also known as the problem of finding the best lattice packing of spheres in $n$ dimensons. The density of the best lattice packing in $n$ dimensions is, following your notation, $ \frac{ \pi^{n/2} }{ \Gamma( 1 + \frac{n}{2}) }\mu_{n}^{n}$.
