数字信号处理(英文版).pptVIP

What is the periodic sampling? Two evaluating methods: (1) Graphical method (2) Analytical method Example As illustrated in the following Figures, Matlab Applications Linear Convolution of sequences Y=conv(x,h) Problems: p.24-25 1,2,3,5,11,12,13 Using convolution to show that the Fourier transform of a triangular function has its first null at twice the frequency of the Fourier transform of a rectangular function. * Applying the Convolution Theorem * Summary 2.1 Aliasing: Signal Ambiguity in the Frequency Domain 2.2 Sampling Low-Pass Signals 2.3 A Generic Description of Discrete Convolution 2.3.1 Discrete Convolution in the Time Domain 2.3.2 The Convolution Theorem 2.3.3 Applying the Convolution Theorem * Understanding DSP, Second Edition * Chapter 2Periodic Sampling * * Outline 2.1 Aliasing: Signal Ambiguity in the Frequency Domain 2.2 Sampling Low-Pass Signals 2.3 A Generic Description of Discrete Convolution 2.3.1 Discrete Convolution in the Time Domain 2.3.2 The Convolution Theorem 2.3.3 Applying the Convolution Theorem If a discrete-time signal is obtained in terms of then the sampling process is called the periodic sampling. sampling period or sampling interval in seconds sampling frequency in hertz sampling angular frequency in radians per second * There is a frequency-domain ambiguity associated with discrete-time signal samples that does not exist in the continuous signal world 2.1 Aliasing: Signal Ambiguity in the Frequency Domain * When sampling at a rate of fs samples/s, if k is any positive or negative integer, we cannot distinguish between the sampled values of a sinewave of fo Hz and a sinewave of (fo+kfs) Hz. * The pattern shows how signals residing at the intersection of a horizontal line and a sloped line will be aliased to all of the intersections of that horizontal line and all other lines with like slo