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Basic System Properties
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Memory Invertibility Causality Stability Time Invariance Linearity
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Memory Memoryless –output for each value of independent variable at a given time is dependent on the input at only that same time y[n] = 2*x[n] - x^2*[n] memoryless Capacitor is a C-T system with memory In physical systems memory is directly associated with the storage of energy y[n] = x[n-1] memory D-T systems implemented with uP, memory is associated with storage registers Memory typically suggests storing past values but definition covers systems with outputs dependant upon future values of input and output
![Memory Memoryless –output for each value of independent variable at a given time is dependent on the input at only that same time y[n] = 2*x[n] - x^2*[n] memoryless Capacitor is a C-T system with memory In physical systems memory is directly associated with the storage of energy y[n] = x[n-1] memory D-T systems implemented with uP, memory is associated with storage registers Memory typically suggests storing past values but definition covers systems with outputs dependant upon future values of input and output](http://images.slideplayer.com./23/6879771/slides/slide_3.jpg "Memory Memoryless –output for each value of independent variable at a given time is dependent on the input at only that same time y[n] = 2*x[n] - x^2*[n] memoryless Capacitor is a C-T system with memory In physical systems memory is directly associated with the storage of energy y[n] = x[n-1] memory D-T systems implemented with uP, memory is associated with storage registers Memory typically suggests storing past values but definition covers systems with outputs dependant upon future values of input and output")
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Invertibilty & Inverse Invertible –Distinct inputs lead to distinct outputs y[n] = 2*x[n] inverse system is y[n] = ½*x[n] Noninvertible systems –y[n] = 0 violates distinct outputs –y(t) = x^2(t) can’t tell sign of input from the output Encoding/Decoding Lossless compression
![Invertibilty & Inverse Invertible –Distinct inputs lead to distinct outputs y[n] = 2*x[n] inverse system is y[n] = ½*x[n] Noninvertible systems –y[n] = 0 violates distinct outputs –y(t) = x^2(t) can’t tell sign of input from the output Encoding/Decoding Lossless compression](http://images.slideplayer.com./23/6879771/slides/slide_4.jpg "Invertibilty & Inverse Invertible –Distinct inputs lead to distinct outputs y[n] = 2*x[n] inverse system is y[n] = ½*x[n] Noninvertible systems –y[n] = 0 violates distinct outputs –y(t) = x^2(t) can’t tell sign of input from the output Encoding/Decoding Lossless compression")
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Causality Non-anticipative Depends only on present and past values of inputs Non-causal –output has a value before input –output responds to an input that hasn't occured yet Causal y[n] = y[n-1], y[n] = Sk=-inf to n x[k] Non-causal y[n] = x[n] – x[n+1], y(t) = x(t+1) All Memoryless systems are causal – Why? Causality not a constraint in image processing In processing signals recorded previously (speech, geophysical, meterological) we are not constrained to causal processing y[n] = x[-n] causal for n > 0 but what about n < 0? y(t) = x(t)*cos(t+1) causal or noncausal?
![Causality Non-anticipative Depends only on present and past values of inputs Non-causal –output has a value before input –output responds to an input that hasn t occured yet Causal y[n] = y[n-1], y[n] = Sk=-inf to n x[k] Non-causal y[n] = x[n] – x[n+1], y(t) = x(t+1) All Memoryless systems are causal – Why.](http://images.slideplayer.com./23/6879771/slides/slide_5.jpg "Causality not a constraint in image processing In processing signals recorded previously (speech, geophysical, meterological) we are not constrained to causal processing y[n] = x[-n] causal for n > 0 but what about n < 0. y(t) = x(t)*cos(t+1) causal or noncausal .")
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Stability Stable system –Small inputs lead to responses that do not diverge Stable – pendulum Unstable – inverted pendulum, bank account BIBO – Bounded Input = Bounded Output If we suspect a system is unstable –Look for a specific bounded input that leads to an unbounded output –One example proves unstable –If one example difficult to find use a different method Try unit step on y(t) = tx(t)
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Time Invariance Behavior and characteristics fixed over time –R C circuit – same results today as tomorrow System is Time Invariant if –A time shift in the input signal results in –Identical time shift in the output signal A system is Time Invariant if – y[n]=x[n] and y[n-n0]=x[n-n0] Examples –y(t) = sin[x(t)] use t-t0 concept to prove –y[n] = nx[n] use x[n]=d[n] & x[n]=d[n-1] to disprove –y(t) = 2x(t) ?
![Time Invariance Behavior and characteristics fixed over time –R C circuit – same results today as tomorrow System is Time Invariant if –A time shift in the input signal results in –Identical time shift in the output signal A system is Time Invariant if – y[n]=x[n] and y[n-n0]=x[n-n0] Examples –y(t) = sin[x(t)] use t-t0 concept to prove –y[n] = nx[n] use x[n]=d[n] & x[n]=d[n-1] to disprove –y(t) = 2x(t)](http://images.slideplayer.com./23/6879771/slides/slide_7.jpg "Time Invariance Behavior and characteristics fixed over time –R C circuit – same results today as tomorrow System is Time Invariant if –A time shift in the input signal results in –Identical time shift in the output signal A system is Time Invariant if – y[n]=x[n] and y[n-n0]=x[n-n0] Examples –y(t) = sin[x(t)] use t-t0 concept to prove –y[n] = nx[n] use x[n]=d[n] & x[n]=d[n-1] to disprove –y(t) = 2x(t)")
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Linearity A linear system is a system that possesses the important property of superposition –The response to x1(t) + x2(t) is y1(t) + y2(t) –The response to ax1(t) is ay1(t) where a is any complex constant Systems can be Linear without being Time Invariant Systems can be Time Invariant without being Linear
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