程序代写案例-ELEC6218
时间:2022-01-07
ELEC6218 Signal Processing
Statistical Signal Processing Coursework
Submission Details
This assignment contributes 10% of your final mark for the ELEC6218 Signal Processing mod-
ule.
You are required to produce a write-up, which needs to include the derivations, calculations,
explanations and Matlab code, that are requested in the questions below.
When you are finished, you need to submit the assignment at C-BASS
https://handin.ecs.soton.ac.uk/handin/2122/ELEC6218/1/ before 4pm on Tuesday
11/01/2022. You only need to make an electronic submission.
If you notice any mistakes in this document or have any queries about it, please email me at
meh@ecs.soton.ac.uk.
Mohammed El-Hajjar
Learning Outcomes
1. Apply maximum likelihood estimation technique;
2. Implement your estimator in Matlab for verification and testing.
Table 1: Marking Scheme
Accuracy of results: Are the obtained results correct? Is the formulation
correct?
50%
Interpretation of results: How well are the questions posed in the assignment
answered? Do you answer all parts of the questions? Do you include the
required derivations? Do you explain your derivations when requested?
50%
1
Amplitude and frequency estimation of a sinusoidal signal
Consider a sinusoidal signal x[n] embedded in White Gaussian noise (WGN), which can be
represented as
x[n] = A cos(2pif0n) + w[n], n = 0, 1, 2, · · · , N − 1,
where A > 0 is the amplitude, 0 < f0 < 0.5 is the frequency and w[n] is the WGN with mean
0 and variance σ2.
1. Find the maximum likelihood estimate (MLE) of the amplitude A and the frequency f0
of the sinusoidal signal.
2. Consider a sinusoid x[n] = 1.25 cos(2× pi× 0.15× n) +w[n], with w[n] having a variance
σ2 = 0.1 and N = 200.
(a) Write a Matlab code that implements your MLE estimate in part 1 above to find Aˆ
and fˆ0, which represent the estimates of the A and f0.
(b) Include in your write up the output values of your Matlab code for Aˆ and fˆ0.
Hint: An idempotent matrix A has the following characteristic: A2 = A.
In your analysis, you will get a matrix of the form
(
I−H(HTH)−1HT ). This will be idempotent
matrix.
2


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