00:00 - Example: f(x,y) uniform in 1x1 square in 1st and 3rd quadrants (revisited, Lec.30)
05:15 - Another proof min MSE via orthogonality (example)
17:22 - Uncorrelated check for error of min.MSE estimator with x^k, k:odd!
29:10 - Example: x = y + n, y and n zero-mean jointly Gaussian, find min. MSE yhat(x).
48:50 - Conclusion #1: For jointly gaussian rv's, the posterior density is Gaussian
50:44 - Conclusion #2: Non-zero mean case is a simple adaptation of zero mean case

Document for the proof of Conclusion #1: .pdf

Corrections:
12:13 - Unif([a,b+\Delta]) should be Unif([a,a+\Delta]) (Thanks Ugur Berk S.)

18:57 - For the explanations given on the board "k: arbitrary integer" should be "k: arbitary **odd** integer" (the results are trivially valid for even valued k, since f(x,y) = f(-x,-y), i.e. symmetric wrt to origin and many integrals with even valued k is equal to zero due to this symmetry) (Thanks Ugur Berk S.)

20:23 - sgn(x) x^k = |x|^k is only valid for odd valued k (Thanks Ugur Berk S.) For even valued say k = 2m, 1. E{ sgn(x) x^{2m} } = 0. Since, sgn(x) x^k = sgn(x) x^{2m} is an odd function of "x": Hence E{ sgn(x) x^{2m} } = \int f(x) sgn(x) x^{2m} dx = 0 since f(x) is an even function (i.e. symmetric wrt to origin f(x) = f(-x)) and then the integrand is an odd function. 2. E{ yx^{2m} } = 0. Since g(x,y) = yx^{2m} is odd symmetric with respect to the origin (g(x,y) = - g(-x,-y)); hence, \int \int f(x,y) g(x,y) dx dy = 0. This equality can be verified by a simple exchange of variables x2 = -x, y2=-y, then \int \int f(x,y) g(x,y) dx dy = - \int \int f(x2,y2) g(x2,y2) dx2 dy2 which gives the result of integration as 0. Hence all the results given on the board assume "k" is taken as an odd integer. I am explaining this a bit more in a later lecture, that is in 6:35 of Lec. 35a, but I should have clarified this during this lecture, indeed sorry CC)

00:00 - Linear Minimum Mean Square Error (LMMSE) Estimators
02:00 - Example: LMMSE estimator in the form yhat = ax + b
05:04 - Deriving normal equations, by partial diff. (example)
10:59 - Solving normal equations (example)
16:40 - LMMSE calculation (example)
27:55 - Comment #1: LMMSE are parametric estimators not as good as min. MSE est. in general
29:40 - Comment #2: LMMSE est. = min. MSE est for jointly Gaussian observations and desired r.v.
30:56 - Comment #3: LMMSE is used in practice, since we only have moment estimates at our disposal
33:51 - 2nd derivation (more general) for normal Equations (gradient calc.)
42:35 - Normal equation: R_x w = r_xy
45:31 - 2nd derivation (more general) for LMMSE value
51:01 - Example: LMMSE estimator in the form yhat = ax + b (revisited)

00:00:00 - LMMSE Estimation (summary)
00:03:32 - Example: x[n] = c + w[n], c and w[n] uncorrelated zero mean r.v.'s, n={1, ... , N}
00:05:20 - Discussing on problem set-up (example)
00:09:34 - Writing normal equations (example)
00:19:03 - Introducing SNR definition (example)
00:23:00 - Solving normal equations (example)
00:31:40 - Calculating LMMSE value (example)
00:34:30 - Comments: special case of infinite SNR (example)
00:34:48 - Comments: N observations with SNR = 1 or 1 observation with SNR = N
00:37:04 - Example: x[n] = c + w[n], c (non-zero mean) and w[n] uncorrelated r.v.'s, n={1, ... , N}
00:40:14 - Introducing SNR definition (example)
00:41:50 - Solution of normal equations (example)
00:42:57 - Is LMMSE estimator for this problem biased? (example)
00:47:17 - Removing bias with an affine estimator (example)
00:53:15 - Writing normal equations for affine estimator (example)
00:59:05 - Solving normal equations for affine estimator (example)
01:00:32 - Finalizing the estimator expression (example)

Corrections:
22:33 - NxN entry of the matrix should be 1 + 1/SNR_N (not 1) (Thanks to Ugur Berk S.)

38:50 - E{ \sigma_w1^2 } should be E{ w_1^2} in E{x_1^2 } = E{c^2} + E{ \sigma_w1^2 } (Thanks to Ege. E)

00:00 - Example: xvec = pvec \times c + nvec; pvec: known vector; c and nvec r.v.'s
02:33 - Derivation of Normal Equations for LMMSE est. (complex valued case)
13:02 - Derivation of LMMSE value (complex valued case)
22:57 : Link to paper: .pdf
25:03 - Discussion on the application related with example
26:45 - Solution for Identity Noise Cov. Mat. (example)
30:38 - Matrix inversion lemma
38:11 - Expression for the estimator (example)
41:27- Solution for General Noise Cov. Mat. (example)
42:42 - Solution by whitening (example)

Matrix Inversion Lemma: wikipedia link

00:00 - Example: x,y unif. dist. in 1x1 square in 1st and 3 quadrants (Lec.30, revisited)
01:01 - Min. MSE Linear/Affine estimator yhat(x) (example)
06:30 - E{yx^k} and E{x^k} expressions (example)
15:05 - Using powers of the observation value in the min. MSE estimator (example)
25:28 - min. Cubic MSE estimator and its MSE value (example)
29:20 - Higher Order Estimators, Matlab Results (example) link: youtube-link
32:38 - Properties of LMMSE Estimators
32:43 - Property 1: Geometric (Vector Space) Interpretation
42:17 - Property 2: Multiple r.v. estimation (Total MSE minimization)
54:17 - Estimator expression for total MSE minimization (property 2)
55:34 - Example: xvec = Hyvec + n. Find LMMSE estimator for xvec. (property 2)

Link to supplementary video for MATLAB content: youtube-link

00:00 - Property 3: Linear combination of observations as input to LMMSE estimation
04:28 - Recursive estimation discussion
23:37 - Recursive estimator expression
24:04 - Innovation
25:15 - Property 4: LMMSE estimation of a linear combination of desired r.v.'s from same set of observations

Corrections:
28:50 - zhat = M yhat should be zhat = N yhat (Thanks Ugur Berk S.)

00:00 - Wiener Filtering (Problem Setup)
03:08 - FIR Wiener Filtering
04:42 - Deriving Wiener-Hopf (or normal) Equations
22:06 - Min.MSE calculation
25:00 - Example: x[n] = d[n] + v[n], r_d[k] = \alpha^{|k|} , r_v[k] = \sigma_v^2 \delta[k]
32:25 - Writing Normal equations for 2-tap filter (example)
36:50 - Calculation of LMMSE value for 2-tap filter (example)
40:42 - 1-tap FIR Wiener filter derivaiton (example)
45:06 - SNR before and after Wiener filtering (example)
51:30 - SNR-after with 1-tap Wiener filter (example)
53:04 - SNR-after with 2-tap Wiener filter (example)
59:10 - What is the maximum SNR-after with 2-tap filter? (example)
59:30 - Max. SNR filter derivation (example)

00:00 - FIR Wiener filtering (review)
4:30 - Categorization of Signal Processing Operations
4:47 - Filtering (categorization)
6:15 - Smoothing (categorization)
13:20 - Prediction (categorization)
19:50 - Example: Two-tap linear predictor for x[n] with r_x[k] = \alpha^|k|
32:34 - Comments: Prediction error as uncorrelated part of the observation
40:10 - Comments: Prediction error filter
42:30 - Backward prediction
47:25 - Auto-correlation of time-reversed WSS process (backward prediction)
50:20 - Remark: Auto-correlation matrix estimation with time-reversed vectors for WSS processes
54:17- Auto-correlation matrix for the samples of WSS processes (remark)
58:47 - Expression for the auto-correlation matrix estimation for WSS process samples (remark)

00:00:00 - FIR Wiener Filtering (review)
00:02:10 - IIR Non-Causal Wiener Filtering
00:10:34 - IIR Non-Causal Wiener filter expression in Fourier domain
00:12:15 - MSE expression for IIR Non-Causal Wiener Filter
00:23:00 - Filtering application (noise removal) for IIR Non-Causal Wiener filtering
00:26:55 - Comment #1: Impulse response of IIR Non-Causal Wiener filter is an even sequence
00:28:20 - Comment #2: IIR Non-Causal Wiener filter processes each spectrum sample independent of other samples
00:30:26 - Connection between Comment #1 and the forward-backward time invariance of WSS processes (Lec. 37 link: youtube-link)
00:35:51 - Connection between Comment #2 and the fact that FT decorrelates WSS processes (Lec 27b link: youtube-link)
00:37:55 - Pictorial interpretation of IIR Non-Causal Wiener filtering for filtering (noise removal) application
00:41:44 - MSE calculation for IIR Non-Causal Wiener filtering for filtering (noise removal) application
00:48:20 - Example: x[n] = d[n] + v[n], r_d[k] = 0.8^|k| , r_v[k] = \delta_v[k], Find IIR NC Wiener filter to estimate d[n].
1:07:05 - MSE calculation for IIR Non-Causal Wiener filter (example)

00:00 - IIR Causal Wiener Filtering
02:13 - Deriving normal equations by differentiation
06:54 - Special case: Input is white noise
09:57 - General case: Decorrelating input to generate white noise input artificially
30:03 - IIR Causal Wiener Filter in z-domain
37:06 - Example: x[n] = d[n] + v[n], r_d[k] = 0.8^|k|, r_v[k] = \sigma_v^2\delta[k]
01:09:44 - Summary of results for 1 Tap, 2 Tap, Causal IIR, Non-Causal IIR Wiener filter result for the same example

Corrections:
37:10 - r_v[k] should be r_v[k] = \sigma_v^2 \delta[k] (white noise)

00:00 - Ergodicity
03:00 - Mean ergodicity
04:02 - Sample mean estimator
08:30 - Question on the convergence issues for sample mean estimator as N goes to infinity.
12:20 - Unbiasedness of sample mean estimator
14:01 - Consistency of sample mean estimator
27:10 - Necessary and Sufficient Condition for mean ergodicity
29:04 - An equivalent necessary and sufficient condition for mean ergodicity
29:40 - Sufficient condition for mean ergodicity
33:06 - Example: Mean-ergodic and not mean-ergodic r.p. example
49:00 - Ergodicity in auto-correlation
54:05 - Biased and unbiased estimators for auto-correlation
58:10 - Biased auto-correlation estimators always gives a valid auto-correlation sequence
01:06:10 - Consistency of auto-correlation estimator

00:00:00 - Best Linear Unbiased Estimator (BLUE)
00:01:15 - Illustration of BLUE on a simple sample: x_k = c + w_k, k={1,2}, Find chat_BLUE.
00:07:11 - MSE expression for chat (illustration)
00:09:41 - Comment on MSE: Unrealizable estimator unless estimator is unbiased (illustration)
00:12:15- Optimization problem for minimum MSE unbiased estimator (illustration)
00:19:15 - Solution for uncorrelated noise (illustration)
00:22:34 - Precision = 1/noise-variance definition (illustration)
00:28:45 - Comparison with a similar random parameter estimation problem (Lec.33 link : youtube-link)
00:31:04 - General Case for the BLUE estimator
00:33:47 - Total MSE derivation (general case)
00:36:26 - Condition for the unbiased estimator (general case)
00:41:07 - Total MSE expression (general case)
00:44:17 - Optimization problem for BLUE estimator (general case)
00:47:23 - BLUE Estimator expression (general case)
00:49:45 - Total MSE expression for BLUE estimator (general case)
00:51:37- Special case #1: White noise (Rn = \sigma_n^2 \times Identity )
00:54:30 - Comment on case #1: LS solution is the BLUE for white noise
00:55:55 - Special case #2: Non-white noise (Rn \neq \sigma_n^2 \times Identity )
01:02:16 - Comment on case #2: Whitened LS solution is the BLUE estimator
01:03:30 - Revisiting earlier illustrative example
01:08:26 - Comparison with random parameter case, LMMSE estimation (general case)

00:00:00 - Introduction to the end of EE 503!
00:00:30 - Karhunen Loeve (KL) Transform
00:03:57 - Desired properties for the KL transformation
00:06:28 - KL Transformation for 1-dimensional approximation (1D case)
00:14:25 - MSE expression for the problem (1D case)
00:23:23 - MSE minimizing solution (1D case)
00:25:15 - Eigenvectors of R_x matrix (reminder)
00:29:16 - Solution for optimal sub-space (1D case)
00:32:00 - min. MSE expression (1D case)
00:33:48 - KL Transformation for 2-dimensional approximation (2D case)
00:38:56 - Reduction to the 1D approximation case (2D case)
00:56:14 - Solution for optimal sub-space (2D case)
00:57:27 - min. MSE expression (2D case)
01:03:30 - Comment on the uncorrelatedness of expansion coefficients
01:05:55 - KL transformation (General case)
01:07:16 - Comment: Application Example: Signal Compression
01:14:34 - Comment: Case of WSS processes (Lec. 23b link: youtube-link)
01:32:26 - Goodbye!