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References
Afflerbach L, Grothe H (1985) Calculation of Minkowski-reduced lattice bases. Computing 35:269–276
Agrell E, Eriksson T, Vardy A, Zeger K (2002) Closest point search in lattices. IEEE Trans Inf Theory 48:2201–2214
Brun V (1919) En generalisation av kjedebrøken I. Skr Vid ensk Selsk Kristiana. Mat Nat Klasse 6:1–29
Brun V (1920) En generalisation av kjedebrøken II. Skr Vid ensk Selsk Kristiana. Mat Nat Klasse 6:1–24
Chen J, Hu K, Wang Q, Sun Y, Shi Z, He S (2017) Narrowband internet of things: implementations and applications. IEEE Internet Things J 4(6):2309–2314
Deng R, He S, Cheng P, Sun Y (2017) Towards balanced energy charging and transmission collision in wireless rechargeable sensor networks. J Commun Netw 19(4):341–350
Gauss CF (1801) Disquisitiones arithmeticae. Springer, Berlin
Hassibi A, Boyd S (1998) Integer parameter estimation in linear models with applications to GPS. IEEE Trans Signal Process 46:2938–2952
Helfrich B (1985) Algorithms to construct Minkowski reduced and Hermite reduced lattice bases. Theory Comput Sci 41:125–139
Hermite C (1850) Extraits de lettres de M. Hermite à M. Jacobi sur différents objets de la théorie des nombres, deuxiéme lettre. Journal für die reine und angewandte Mathematik 40:279–290
Jayaweera SK (2007) V-BLAST-Based virtual MIMO for distributed wireless sensor networks. IEEE Trans Commun 55:1867–1872
Kannan R (1983) Improved algorithms for integer programming and related problems. In: 15th ACM symposium on theory of computing, pp 193–206
Korkine A, Zolotareff G (1873) Sur les formes quadratiques. Mathematische Annalen 6:366–389
Lagrange JL (1773) Recherches d’arithmétique. Nouveaux Mémoires de l’Académie de Berlin
Lenstra AK, Lenstra HW, Lovász L (1982) Factoring polynomials with rational coefficients. Mathematische Annalen 261:515–534
Minkowski H (1896) Geometrie der Zahlen. Teubner-Verlag
Nguyen PQ, Stehlé D (2009) Low-dimensional lattice basis reduction revisited. ACM Trans Algorithms, Article 46 5(4):1–48
Nguyen PQ, Vallée B (2010) The LLL algorithm. Springer, Berlin/Heidelberg
Semaev I (2001) A 3-dimensional lattice reduction algorithm. In: Cryptography and lattices conference, pp 181–193
Seysen M (1993) Simultaneous reduction of a lattice basis and its reciprocal basis. Combinatorica 13:363–376
Teunissen PG, Jonge PD, Tiberius C (1997) The least-squares ambiguity decorrelation adjustment: its performance on short GPS baselines and short observation spans. J Geod 71:589–602
Wen J, Chang XW (2015) A modified KZ reduction algorithm. In: 2015 IEEE international symposium on information theory (ISIT), pp 451–455
Wen J, Chang XW (2017) GfcLLL: a Greedy selection based approach for fixed-complexity LLL reduction. IEEE Commun Lett 21:1965–1968
Wübben D, Seethaler D, Jaldén J, Matz G (2011) Lattice reduction: a survey with applications in wireless communications. IEEE Signal Process Mag 28:70–91
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Wen, J. (2019). Lattice Reduction and Its Applications in Wireless Sensors Network. In: Shen, X., Lin, X., Zhang, K. (eds) Encyclopedia of Wireless Networks. Springer, Cham. https://doi.org/10.1007/978-3-319-32903-1_264-1
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