Paper detail

On a lattice generalisation of the logarithm and a deformation of the Dedekind eta function

We consider a deformation $E_{L,Λ}^{(m)}(it)$ of the Dedekind eta function depending on two $d$-dimensional simple lattices $(L,Λ)$ and two parameters $(m,t)\in (0,\infty)$, initially proposed by Terry Gannon. We show that the minimizers of the lattice theta function are the maximizers of $E_{L,Λ}^{(m)}(it)$ in the space of lattices with fixed density. The proof is based on the study of a lattice generalization of the logarithm, called lattice-logarithm, also defined by Terry Gannon. We also prove that the natural logarithm is characterized by a variational problem over a class of one-dimensional lattice-logarithm.