Paper detail

Lattice polytopes, finite abelian subgroups in $\SL(n,\C)$ and coding theory

We consider $d$-dimensional lattice polytopes $Δ$ with $h^*$-polynomial $h^*_Δ=1+h_k^*t^k$ for $1<k<(d+1)/2$ and relate them to some abelian subgroups of $\SL_{d+1}(\C)$ of order $1+h_k^*=p^r$ where $p$ is a prime number. These subgroups can be investigate by means of coding theory as special linear constant weight codes in $\F_p^{d+1}$. If $p =2$, then the classication of these codes and corresponding lattice polytopes can be obtained using a theorem of Bonisoli. If $p > 2$, the main technical tool in the classification of these linear codes is the non-vanishing theorem for generalized Bernoulli numbers $B_{1,χ}^{(r)}$ associated with odd characters $χ:\F_q^*\to\C^*$ where $q=p^r$. Our result implies a complete classification of all lattice polytopes whose $h^*$-polynomial is a binomial.