an:06513482
Zbl 1366.94768
Karpuk, David; Ernvall-Hyt??nen, Anne-Maria; Hollanti, Camilla; Viterbo, Emanuele
Probability estimates for fading and wiretap channels from ideal class zeta functions
EN
Adv. Math. Commun. 9, No. 4, 391-413 (2015).
00350163
2015
j
94B70 11R42 11H71 94B75
lattice codes; zeta functions; ideal lattices; inverse norm sum; Rayleigh fading channel
Summary: In this paper, new probability estimates are derived for ideal lattice codes from totally real number fields using ideal class Dedekind zeta functions. In contrast to previous work on the subject, it is not assumed that the ideal in question is principal. In particular, it is shown that the corresponding inverse norm sum depends not only on the regulator and discriminant of the number field, but also on the values of the ideal class Dedekind zeta functions. Along the way, we derive an estimate of the number of elements in a given ideal with a certain algebraic norm within a finite hypercube. We provide several examples which measure the accuracy and predictive ability of our theorems.