References
- [Conway and Sloane 99] J. Conway and N. J. A. Sloane. Sphere Packings, Lattices and Groups, 3rd ed. New York: Springer, 1999.
- [Ernvall-Hytönen 12] A.-M. Ernvall-Hytönen. “On a Conjecture by Belfiore and Solé on Some Lattices.” IEEE Trans. Inf. Theory 58: 9 (2012), 5950–5955.
- [Ernvall-Hytönen and Sethuraman 15] A.-M. Ernvall-Hytönen and B. A. Sethuraman. “Counterexample to the Generalized Belfiore-Solé Secrecy Function Conjecture for l-Modular Lattices.” International Symposium on Information Theory, Hong Kong, June 14–19, 2015.
- [Hou and Oggier 17] X. Hou and F. Oggier. “Modular Lattices from a Variation of Construction A over Number Fields.” Adv. Math. Commun. 11: 4 (2017), 719–745. Available online (https://www.arxiv.org/abs/1604.01583).
- [Hou et al. 14] X. Hou, F. Lin, and F. Oggier. “Construction and Secrecy Gain of a Family of 5-modular Lattices.” IEEE Information Theory Workshop (ITW), Hobart, Tasmania, Australia, 2014.
- [Lin and Oggier 13] F. Lin and F. Oggier. “A Classification of Unimodular Lattice Wiretap Codes in Small Dimensions.” IEEE Trans. Inf. Theory 59: 6 (2013), 3295–3303.
- [Lin and Oggier 12] F. Lin and F. Oggier. “Gaussian Wiretap Lattice Codes from Binary Self-dual Codes.” IEEE Information Theory Workshop, Lausanne, 2012.
- [Lin et al. 15] F. Lin, F. Oggier, and P. Solé. “2- and 3-modular Lattice Wiretap Codes in Small Dimensions.” Appl. Algeb. Eng. Commun. Comput. 25: 571 (2015), 571–590.
- [Nipp 91] G. L. Nipp. Quaternary Quadratic Forms. New York: Springer Verlag, 1991.
- [Oggier et al. 16] F. Oggier, J.-C. Belfiore, and P. Solé. “Lattice Codes for the Wiretap Gaussian Channel: Construction and Analysis.” IEEE Trans. Inform. Theory 62: 10 (2016), 5690–5708.
- [Pinchak 13] J. Pinchak. “Wiretap Codes: Families of Lattices Satisfying the Belfiore-Solé Secrecy Function Conjecture.” IEEE International Symposium on Information Theory, Istanbul, 2013.
- [Pinchak and Sethuraman 14] J. Pinchak and B. A. Sethuraman. “The Belfiore-Solé Conjecture and a Certain Technique for Verifying it for a Given lattice.” Information Theory and Applications, 2014.
- [Quebbemann 95] H.-G. Quebbemann. “Modular Lattices in Euclidean Spaces.” J. Numb. Theory 54 (1995), 190–202.
- [Quebbemann 97] H.-G. Quebbemann. “Atkin-Lehner Eigenforms and Strongly Modular Lattices.” L’Enseign. Math. 43 (1997), 55–65.
- [Rains and Sloane 98] E. M. Rains and N. J. A. Sloane. “The Shadow Theory of Modular and Unimodular Lattices.” J. Numb. Theory 73 (1998), 359–389.
- [SageMath XX] SageMath. “The Sage Mathematics Software System (Version 7.3).” The Sage Developers, (2016). Available at http://www.sagemath.org.
- [Scharlau and Schulze-Pillot 99] R. Scharlau and R. Schulze-Pillot. “Extremal Lattices.” In Algorithmic Algebra and Number Theory (Heidelberg, 1997), edited by B.H. Matzat, GM Greuel, G. Hiss, pp 139–170. Berlin: Springer, 1999.
- [Gabriele Nebe and Neil Sloane XX] Available at http://www.math.rwth-aachen.de/Gabriele.Nebe/LATTICES/modular.html