[1] L. Baumert and J. Mykkeltveit, Weight distributions of some irreducible cyclic codes, JPL Tech. Rep. 32-1526 (1973), 128-131.
[2] L. Carlitz, Gauss sums over finite fields of order  �Acta Arithm. 15 (1696),247-265.
[3] L. Carlitz, A note on exponential sums, Pacific J. Math. 30 (1969), 35-37.
[4] L. Carlitz, Explicit evaluation of certain exponential sums, Math. Scand. 44 (1979), 5-16.
[5] P. Charpin, Open problems on cyclic codes, Handbook of Coding Theory I, V. S. Pless and W. C. Huffman, eds., Elsevier, 1998, pp. 963-1063.
[6] P. Charpin, T. Helleseth and V. Zinoviev, Propagation characteristics of  Finite Fields Appl. 13 (2007), 366-381.
[7] P. Charpin, A. Tiet�v�inen and V. Zinoviev, On binary cyclic codes with distance  Problems Inform. Transmission 3 (1997), 287-296.
[8] C. Ding, T. Helleseth, H. Niederreiter and C. Xing, The minimum distance of the duals of binary irreducible cyclic codes, IEEE Trans. Inform. Theory 48 (2002), 2679-2689.
[9] M. Grassl, Bounds on the minimum distance of linear codes. [Online]. Available: http://www.codetables.de.
[10] K. Hardy, J. B. Muskat and K. S. Williams, A deterministic algorithm for solving  in coprime integers u and v, Math. Comp. 55 (1990), 327-343.
[11] I. Honkala and A. Tiet�v�inen, Codes and number theory, Handbook of Coding Theory, Elsevier, Amsterdam, 1998, pp. 1141-1194.
[12] W. C. Huffman and V. Pless, Fundamentals of Error-correcting Codes, Cambridge Univ. Press, 2003.
[13] G. Lachaud and J. Wolfmann, The weights of the orthogonals of the extended quadratic binary Goppa codes, IEEE Trans. Inform. Theory 36 (1990), 686-692.
[14] P. Langevin, Calculs de certaines sommes de Gauss, J. Number Theory 63 (1997), 59-64.
[15] N. Leander, Monomial bent functions, IEEE Trans. Inform. Theory 52 (2006), 738-743.
[16] R. Lidl and H. Niederreiter, Introduction to Finite Fields and their Applications, revised ed., Cambridge Univ. Press, 1994.
[17] J. MacWilliams and J. Seery, The weight distributions of some minimal cyclic codes, IEEE Trans. Inform. Theory 27 (1981), 796-806.
[18] O. Mbodj, Quadratic Gauss sums, Finite Fields Appl. 4 (1998), 347-361.
[19] R. J. McEliece, Irreducible cyclic codes and Gauss sums, Combinatorics, Part 1, Proc. Advanced Study Inst., Breukelen, 1974, pp. 179-196.
[20] M. Moisio, Exponential sums, Gauss sums, and irreducible cyclic codes, Acta Univ. Oulu A306 (1998). Available: http://www.uwasa.fi/~mamo/.
[21] M. Moisio, A note on evaluations of some exponential sums, Acta Arith. 93 (2000), 117-119.
[22] M. Moisio, The moments of a Kloosterman sum and the weight distribution of a Zetterberg type binary cyclic code, IEEE Trans. Inform. Theory 53 (2007), 843-847.
[23] M. Moisio, On the moments of Kloosterman sums and fibre products of Kloosterman curves, Finite Fields Appl. 14 (2008), 515-531.
[24] M. Moisio and K. Ranto, Kloosterman sum identities and low-weight codewords in a cyclic code with two zeros, Finite Fields Appl. 13 (2007), 922-935.
[25] M. Moisio and K. Vaananen, Two recursive algorithms for computing the weight distribution of certain irreducible cyclic codes, IEEE Trans. Inform. Theory 45 (1999), 1244-1249.
[26] V. Pless, Power moment identities on weight distributions in error correcting codes, Inform. Contr. 6 (1963), 147-152.
[27] M. Rinta-aho, On monomial exponential sums in certain index 2 cases and their connections to coding theory, Acta Univ. Oulu A503 (2008). Available: http://herkules.oulu.fi/isbn9789514287374/.
[28] B. Schmidt and C. White, All two-weight irreducible cyclic codes? Finite Fields Appl. 8 (2002), 1-17.
[29] R. Schoof and M. van der Vlugt, Hecke operators and the weight distributions of certain codes, J. Combin. Theory Ser. A 57 (1991), 163-186.
[30] M. van der Vlugt, On the weight hierarchy of irreducible cyclic codes, J. Combin. Theory Ser. A 71 (1995), 159-167.
[31] M. van der Vlugt, Hasse-Davenport curves, Gauss sums, and weight distributions of irreducible cyclic codes, J. Number Theory 55 (1995), 145-159.
|
