DocumentCode :
1170422
Title :
Optimum impulse response and the van der Maas function
Author :
Temes, Gabor C.
Volume :
19
Issue :
4
fYear :
1972
fDate :
7/1/1972 12:00:00 AM
Firstpage :
336
Lastpage :
342
Abstract :
The optimum impulse response of a band-limited system, viz., the van der Maas function, is derived from considerations based on the theory of entire functions. The 
version of the optimization problem is also discussed. In particular, it is shown that there is no square integrable impulse response that is optimum in Chebyshev\´s sense since the van der Maas function, which is not square integrable, can be regarded as the limit of a sequence of square integrable functions. Some modified 
versions of the optimization problem, in which weighted square integral measures of the sidelobes are prescribed, are also described.
version of the optimization problem is also discussed. In particular, it is shown that there is no square integrable impulse response that is optimum in Chebyshev\´s sense since the van der Maas function, which is not square integrable, can be regarded as the limit of a sequence of square integrable functions. Some modified versions of the optimization problem, in which weighted square integral measures of the sidelobes are prescribed, are also described.Keywords :
Band-limited systems; Computer-aided circuit design; Impulse response; Linear systems; Optimization techniques; Time-domain analysis; Van der Maas function; Admittance; Circuit synthesis; Circuit theory; Electronic circuits; Equations; Frequency; Pipelines; Random variables; Sparse matrices; Stochastic processes;
fLanguage :
English
Journal_Title :
Circuit Theory, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9324
Type :
jour
DOI :
10.1109/TCT.1972.1083478
Filename :
1083478
Link To Document :
