#### Abstract

Normal sequences of lengths n = 18, 19 are constructed. It is proved through an exhaustive search that normal sequences do not exist for n = 17,21,22,23. Marc Gysin has shown that normal sequences do not exist for n = 24. So the first unsettled case is n = 27. Base sequences of lengths 2n - 1, 2n - 1. n. n are constructed for all decompositions of 6n - 2 into four squares for n = 2.4.6 ..... 20 and some base sequences for n = 22.24 are also given. So T-sequences (T-matrices) of length 71 are constructed here for the first time. This gives new Hadamard matrices of orders 213, 781, 1349, 1491, 1633, 2059, 2627, 2769, 3479, 3763, 4331, 4899, 5467, 5609, 5893, 6177, 6461,6603, 6887, 7739, 8023, 8591, 9159, 9443, 9727, 9869.

## Publication Details

Christos Koukouvinos, Stratis Kounias, Jennifer Seberry, C. H. Yang, Joel Yang, On sequences with zero autocorrelation, Designs, Codes and Cryptography, 4, (1994), 327-340.