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Chapter 6 Random Processes and LTI. Power Spectral Density White Noise Process Random Processes in LTI Systems. Huseyin Bilgekul EEE 461 Communication Systems II Department of Electrical and Electronic Engineering Eastern Mediterranean University. Homework Assignments.
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Chapter 6Random Processes and LTI • Power Spectral Density • White Noise Process • Random Processes in LTI Systems Huseyin Bilgekul EEE 461 Communication Systems II Department of Electrical and Electronic Engineering Eastern Mediterranean University
Homework Assignments • Return date: November 14, 2005. • Assignments: Problem 6-15 Problem 6-17 Problem 6-22 Problem 6-25 Problem 6-26
Power Spectral Density • Definition: The PSD Px(f) of a random process is defined by, where the subscript T denotes the truncated version of the signal • Relationship to Time Autocorrelation, Wiener-Khintchine Theorem: When x(t) is a wide sense stationary process, the PSD is defined as: • Average Power of a Random Process
Properties of PSD • Some properties of PSD are: • Px(f ) is always real • Px(f ) > 0 • When x(t) is real, Px(-f )= Px(f ) • If x(t) is WSS, • PSD at zero frequency is:
General Expression PSD of a Digital Signal • General expression for the PSD of a Digital Signal: • F(f ) is the Fourier Transform of the Pulse Shape f(t) • Ts is the sampling interval • R(k) is the autocorrelation of the data: • an and ak+n are the levels of the nth and (n+k)th symbol positions • Pi is the probability of having the ith anan+k product • PSD only depends on the • Pulse shape f(t) • Statistical properties of the data
Example: PSD of Unipolar NRZ Pulses • Possible levels are +A and 0 • Square pulses of width Tb • Find the PSD: 1) Find the spectrum of pulse:
PSD of Unipolar NRZ Pulses 2)Evaluate the autocorrelation function • For k = 0: there are 2 possibilities, an=A or an=0: • For k >0: there are 4 possibilities, an=0 or A and an+k=0 or A:
PSD of Unipolar NRZ Pulses • Simplify using: • Poisson Sum Formula • and
Example: PSD for Bipolar NRZ Signalling • Find the spectrum of pulse: • Find the Autocorrelation • For k = 0: an=A or an= -A: • For k >0: an=-A or A and an+k=-A or A:
R(t) P(f) N0 /2 t f White Noise Process • A random process is said to be a white noise process if the PSD is constant over all frequencies: N0/2
Linear Systems • Recall that for LTI systems: • This is still valid if x and y are random processes, x might be signal plus noise or just noise • What is the autocorrelation and PSD for y(t) when x(t) is known? x(t) X(f ) Rx(t) Px(f ) Linear Network h(t) H(f )
Output of an LTI System • Theorem: If a WSS random process x(t) is applied to a LTI system with impulse response h(t), the output autocorrelation is: • And the output PSD is: • The power transfer function is:
R C y(t) x(t)=n(t) Example RC Low Pass Filter • Input is thermal white noise.
SNR at the Output of a RC LPF • Input SNR is ratio of the input signal to input noise • Output SNR is ratio of the output signal to output noise
SNR at the Output of a RC LPF • Same RC LPF as before, assume: x(t)=si(t)+ni(t) • si(t) =A cos(w0t + q0),deterministic. • ni(t) is white noise, flat PSD over all frequencies. • ergodic noise (time avg=statistical avg). • Input SNR (SNRi) is zero: • Signal Power: A2/2 • Noise Power is infinity.
SNR at the Output of a RC LPF • Output is y(t)=so(t)+no(t) • Output Signal Power • Output Noise Power (from previous example)
Noise Equivalent Bandwidth • For a WSS process x(t), the equivalent bandwidth is: • Input: white noise with a PSD of No/2 to a low pass filter: • The Noise Equivalent Bandwidth is the filter bandwidth of H(f ) that gives the same average noise power as an ideal low pass filter of DC gain H(0)
LP Filter Ideal LP Filter H(f) H(0) B B Noise Equivalent Bandwidth Noise Equivalent Bandwidth
