Hyperbolic zeta-functions of nets and lattices and calculation of optimal coefficients (Q2857940)

The paper presents a survey of the theory of hyperbolic zeta function of lattices. It also reviews the history of the development of the theory.NEWLINENEWLINEThe introduction of the paper contains definitions of corresponding concepts, the aim and contents of the survey, in particular the relations with the hyperbolic zeta function of nets and the theory of Korobov optimal coefficients are considered.NEWLINENEWLINEChapter 2 of the paper discusses integral representation and asymptotic formula for the hyperbolic zeta function \(\zeta_H (\Lambda|\alpha)\) of the given algebraic lattice \(\Lambda\).NEWLINENEWLINEChapter 3 reviews trigonometric sums of lattices and particular values \(\zeta_H (\Lambda|2n)\) and \(\zeta_H (\Lambda|2n+1)\) for integral lattices.NEWLINENEWLINEFollowing chapters are devoted to analytic continuation of \(\zeta_H (\Lambda+\vec{b}|\alpha)\) to \(\zeta_H (\Lambda|\alpha)\) for the lattices of solutions of special congruences and to consideration of Dirichlet series with periodic coefficients and functional equation for the hyperbolic zeta function of any integral and Cartesian lattices. At the end of the paper some current unsolved problems of the theory of hyperbolic zeta function of lattices are considered, in particular among them are problems of existence of analytical continuation for the hyperbolic zeta function for some special type lattices. The paper lists all monographs on which the present survey is based.