This paper investigates cross correlation properties of sequences derived
from GH sequences modulo p, where p is a prime number and presents comparison
with cross correlation properties of pseudo noise sequences. For GH sequences
modulo prime, a binary random sequence B(n) is constructed, based on whether
the period is p-1 (or a divisor) or 2p+2 (or a divisor). We show that B(n)
sequences have much less peak cross correlation compared to PN sequence
fragments obtained from the same generator. Potential applications of these
sequences to cryptography are sketched.Comment: 7 pages, 6 figure