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dc.contributor.advisor Parks, Thomas
dc.creatorMcClellan, James Harold
dc.date.accessioned 2016-04-21T12:02:21Z
dc.date.available 2016-04-21T12:02:21Z
dc.date.issued 1972
dc.identifier.citation McClellan, James Harold. "Chebyshev approximation for non-recursive digital filters." (1972) Master’s Thesis, Rice University. https://hdl.handle.net/1911/89395.
dc.identifier.urihttps://hdl.handle.net/1911/89395
dc.description.abstract An efficient procedure for the design of finite length impulse response filters with linear phase is presented. The algorithm obtains the optimum Chebyshev approximation on separate intervals corresponding to pass and/or stop bands, and is capable of designing very long filters. This approach allows the exact specification of arbitrary band-edge frequencies as opposed to previous algorithms which could not directly control pass and stop band locations and could only obtain N-1 / 2 different band edge locations for a length N low-pass filter, for fixed phi1 and phi2. As an aid in practical application of the algorithm, several graphs are included to show relations among the parameters of filter length, transition width, band-edge frequencies, passband ripple, and stopband attenuation.
dc.format.extent 29 pp
dc.language.iso eng
dc.title Chebyshev approximation for non-recursive digital filters
dc.identifier.digital RICE0433
dc.type.genre Thesis
dc.type.material Text
thesis.degree.department Electrical and Computer Engineering
thesis.degree.discipline Engineering
thesis.degree.grantor Rice University
thesis.degree.level Masters
thesis.degree.name Master of Science
dc.format.digitalOrigin reformatted digital
dc.identifier.callno Thesis E.E. 1972 MCCLELLAN


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