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EE354 : Communications System I
Lecture 6-8: Random signals Aliazam Abbasfar
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Outline Random signals Signals correlation Power spectral density
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Random Processes Ensemble of random signals (sample functions)
Deterministic signals with RVs Voltage waveforms Message signals Thermal noise Samples of a random signal x(t) ; a random variable E[x(t)], Var[x(t)] x(t1), x(t2) joint random variables
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Examples Sinusoid with random phase DC signal with random level
Binary signaling
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Correlation Correlation = statistic similarity
Cross correlation of two random signals RXY(t1,t2)=E[x(t1)y(t2)] Uncorrelated/Independent RSs Autocorrelation R(t1,t2)=E[x(t1)x(t2)] RX(t,t) = E[x2(t)] = Var[x(t)]+E[x]2 Average power P = E[Pi] = E[<xi2(t)>] = <RX(t,t)> Most of RSs are power signals ( 0< P < )
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Wide Sense Stationary (WSS)
A process is WSS if E[x(t)]=mX RX(t1,t2)= E[x(t1)x(t2)]=RX(t2-t1)= RX(t) RX(0)=E[x2(t)]< Stationary in 1st and 2nd moments Autocorrelation RX(t)= RX(-t) |RX(t)| RX(0) RX(t)=0 : samples separated by t uncorrelated Average power P = <E[x2(t)]> = Rx(0)
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Ergodic process Time average of any sample function = Ensemble average ( any i and any g) <g(xi(t))> = E[g(x(t))] Ensemble averages are time-independent DC : <xi(t)> = E[ x(t) ] = mx Total power : <xi2(t)> = E[ x2(t) ] = (sx)2 + (mx)2 Average power : P = E[<xi2(t)>] = Pi Use one sample function to estimate signal statistics Time-average instead of ensemble average
![Ergodic process Time average of any sample function = Ensemble average ( any i and any g) <g(xi(t))> = E[g(x(t))]](http://slideplayer.com/slide/9435275/29/images/7/Ergodic+process+Time+average+of+any+sample+function+%3D+Ensemble+average+%28+any+i+and+any+g%29+%3Cg%28xi%28t%29%29%3E+%3D+E%5Bg%28x%28t%29%29%5D.jpg "Ensemble averages are time-independent. DC : <xi(t)> = E[ x(t) ] = mx. Total power : <xi2(t)> = E[ x2(t) ] = (sx)2 + (mx)2. Average power : P = E[<xi2(t)>] = Pi. Use one sample function to estimate signal statistics. Time-average instead of ensemble average.")
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Examples Sinusoid with random phase DC signal with random level
Binary signaling
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Power spectral density
Time-averaged autocorrelation Power spectral density Average power E, P are obtained by integration of ESD and PSD PSD measurement : use narrowband filters
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Examples X(t) = A cos(wct + f) Y(t) = X(t) cos(wct) WSS ?
RY(t) and GY(f)
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Sum process z(t) = x(t) + y(t)
x(t) and y(t) are WSS RZ(t) = RX(t) + RY(t) + RXY(t) + RXY(-t) GZ(f) = GX(f) + GY(f) + 2 Re[GXY(f)] If X and Y are uncorrelated RXY(t) = mX mY GZ(f) = GX(f) + GY(f) + 2 mX mY d(f)
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Correlations for LTI systems
If x(t) is WSS, x(t) and y(t) are jointly WSS mY = H(0) mX RYX(t) = h(t) Rxx(t) RXY(t) = RYX(-t)= h(-t) Rxx(t) RYY(t) = h(t) h(-t) Rxx(t) GY(f) = |H(f)|2 GX(f)
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Reading Carlson Ch. 9.1, 9.2 Proakis&Salehi 4.1, 4.2,
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