Consider the real zero-mean Gaussian random process xn ~ N(0,1) (the reference channel) and zero-mean Gaussian random no
Posted: Fri May 20, 2022 8:47 pm
Consider the real zero-mean Gaussian random process xn ~ N(0,1)
(the reference channel) and zero-mean Gaussian random noise vn ~
N(0,1) and the process yn = -3xn + vn (the primary channel)
1. Solve for the optimal filter of length 1
2. Solve for the optimal filter of length 2
3. Generate 1000 data samples for the primary and for the
reference channels. Implement the LMS algorithm and plot
(the reference channel) and zero-mean Gaussian random noise vn ~
N(0,1) and the process yn = -3xn + vn (the primary channel)
1. Solve for the optimal filter of length 1
2. Solve for the optimal filter of length 2
3. Generate 1000 data samples for the primary and for the
reference channels. Implement the LMS algorithm and plot