roopunk
Newbie level 1
Is there an example where fourier transform of a signal exists but z transform does not?
I know that z transform is a generalization of fourier transform. So there can be cases such that z transform exists but fourier does not when the ROC in z plane does not contain the unit circle. But is the opposite possible?
I know that z transform is a generalization of fourier transform. So there can be cases such that z transform exists but fourier does not when the ROC in z plane does not contain the unit circle. But is the opposite possible?