The Korkine--Zolotareff (KZ) reduction, and its generalisations, are widely used lattice reduction strategies in communications and cryptography. The KZ constant and Schnorr's constant were defined by Schnorr in 1987. The KZ constant can be used to quantify some useful properties of KZ reduced matrices. Schnorr's constant can be used to characterize the output quality of his block $2k$-reduction and is used to define his semi block $2k$-reduction, which was also developed in 1987. Hermite's constant, which is a fundamental constant lattices, has many applications, such as bounding the length of the shortest nonzero lattice vector and the orthogonality defect of lattices. Rankin's constant was introduced by Rankin in 1953 as a generalization of Hermite's constant. It plays an important role in characterizing the output quality of block-Rankin reduction, proposed by Gama et al. in 2006. In this paper, we first develop a linear upper bound on Hermite's constant and then use it to develop an upper bound on the KZ constant. These upper bounds are sharper than those obtained recently by the authors, and the ratio of the new linear upper bound to the nonlinear upper bound, developed by Blichfeldt in 1929, on Hermite's constant is asymptotically 1.0047. Furthermore, we develop lower and upper bounds on Schnorr's constant. The improvement to the lower bound over the sharpest existing one developed by Gama et al. is around 1.7 times asymptotically, and the improvement to the upper bound over the sharpest existing one which was also developed by Gama et al. is around 4 times asymptotically. Finally, we develop lower and upper bounds on Rankin's constant. The improvements of the bounds over the sharpest existing ones, also developed by Gama et al., are exponential in the parameter defining the constant.
翻译:Korkine- Zolotareff (KZ) 的递减及其概略, 被广泛使用, 在通信和加密中被广泛使用 lattice 削减战略。 KZ 常数和 Schnorrr 的常数由Schnorr 于1987年定义。 KZ 常数可用于量化 KZ 削减矩阵的一些有用属性。 Schnorr 常数可用于描述其区块的降价质量 $2k$, 并用于定义其半区块 $2k$ 的降价, 1987年也开发了该半区块。 Hermit 的常数是基本常数, 是一个常数, 具有基本常数, 具有基本常数的平位和Schnorrentral 常数。 兰肯的常数由1953年的 Rangin 常数引入, 其上值由 Generalto 正在开发, 其上平面的变数由现有平面发展, 和上平面的作者在最近平面上, 向上平面发展了。