Constant amplitude zero autocorrelation waveform

For a CAZAC sequence of length ${\displaystyle N}$  where ${\displaystyle M}$  is relatively prime to ${\displaystyle N}$  the ${\displaystyle k}$ th symbol ${\displaystyle u_{k}}$  is given by:^[1]

${\displaystyle u_{k}=\exp \left(j{\frac {M\pi k^{2}}{N}}\right)}$ 

${\displaystyle u_{k}=\exp \left(j{\frac {M\pi k(k+1)}{N}}\right)}$ 

The power spectrum of a CAZAC sequence is flat.

If we have a CAZAC sequence the time ___domain autocorrelation is an impulse

${\displaystyle r(\tau )=\delta (n)}$ 

The discrete fourier transform of the autocorrelation is flat

${\displaystyle R(f)=1/N}$ 

Power spectrum is related to autocorrelation by

${\displaystyle R(f)=\left|X(f)\right|^{2}}$ 

As a result the power spectrum is also flat.

${\displaystyle \left|X(f)\right|^{2}=1/N}$ 

• CAZAC Sequence Generator (Java applet)