Standard

OPTIMAL SYNTHESIS OF A CLASS OF NONLINEAR CIRCUITS WITH HARMONIC INPUTS. / Lanne, A. A.; Malozemov, V. N.

In: Engineering cybernetics, Vol. 20, No. 4, 1982, p. 56-64.

Research output: Contribution to journalArticlepeer-review

Harvard

Lanne, AA & Malozemov, VN 1982, 'OPTIMAL SYNTHESIS OF A CLASS OF NONLINEAR CIRCUITS WITH HARMONIC INPUTS.', Engineering cybernetics, vol. 20, no. 4, pp. 56-64.

APA

Lanne, A. A., & Malozemov, V. N. (1982). OPTIMAL SYNTHESIS OF A CLASS OF NONLINEAR CIRCUITS WITH HARMONIC INPUTS. Engineering cybernetics, 20(4), 56-64.

Vancouver

Lanne AA, Malozemov VN. OPTIMAL SYNTHESIS OF A CLASS OF NONLINEAR CIRCUITS WITH HARMONIC INPUTS. Engineering cybernetics. 1982;20(4):56-64.

Author

Lanne, A. A. ; Malozemov, V. N. / OPTIMAL SYNTHESIS OF A CLASS OF NONLINEAR CIRCUITS WITH HARMONIC INPUTS. In: Engineering cybernetics. 1982 ; Vol. 20, No. 4. pp. 56-64.

BibTeX

@article{1493f06ea0be45949546cdb2c6154e3a,
title = "OPTIMAL SYNTHESIS OF A CLASS OF NONLINEAR CIRCUITS WITH HARMONIC INPUTS.",
abstract = "The problem of synthesizing nonlinear electronic systems executing the mapping a(cos t) yields y**0(t, a), where y**0(t, a) equals f(a) cos lt or y**0(t, a) equals gamma (t), is considered. This includes the synthesis of rectifiers, various amplitude detectors, frequency multipliers, and a number of other devices. The input signal a(cos t) is split and the problem then reduced to approximation (on the basis of the splitting obtained) of the output y**0(t, a). The proposal is made to perform the approximation using a rational function. It is shown that the two-dimensional problem of Chebyshev approximation that arises in this case reduces to a one-dimensional problem.",
author = "Lanne, {A. A.} and Malozemov, {V. N.}",
note = "Copyright: Copyright 2017 Elsevier B.V., All rights reserved.",
year = "1982",
language = "English",
volume = "20",
pages = "56--64",
journal = "Journal of Computer and Systems Sciences International",
issn = "1064-2307",
publisher = "МАИК {"}Наука/Интерпериодика{"}",
number = "4",

}

RIS

TY - JOUR

T1 - OPTIMAL SYNTHESIS OF A CLASS OF NONLINEAR CIRCUITS WITH HARMONIC INPUTS.

AU - Lanne, A. A.

AU - Malozemov, V. N.

N1 - Copyright: Copyright 2017 Elsevier B.V., All rights reserved.

PY - 1982

Y1 - 1982

N2 - The problem of synthesizing nonlinear electronic systems executing the mapping a(cos t) yields y**0(t, a), where y**0(t, a) equals f(a) cos lt or y**0(t, a) equals gamma (t), is considered. This includes the synthesis of rectifiers, various amplitude detectors, frequency multipliers, and a number of other devices. The input signal a(cos t) is split and the problem then reduced to approximation (on the basis of the splitting obtained) of the output y**0(t, a). The proposal is made to perform the approximation using a rational function. It is shown that the two-dimensional problem of Chebyshev approximation that arises in this case reduces to a one-dimensional problem.

AB - The problem of synthesizing nonlinear electronic systems executing the mapping a(cos t) yields y**0(t, a), where y**0(t, a) equals f(a) cos lt or y**0(t, a) equals gamma (t), is considered. This includes the synthesis of rectifiers, various amplitude detectors, frequency multipliers, and a number of other devices. The input signal a(cos t) is split and the problem then reduced to approximation (on the basis of the splitting obtained) of the output y**0(t, a). The proposal is made to perform the approximation using a rational function. It is shown that the two-dimensional problem of Chebyshev approximation that arises in this case reduces to a one-dimensional problem.

UR - http://www.scopus.com/inward/record.url?scp=0020150627&partnerID=8YFLogxK

M3 - Article

AN - SCOPUS:0020150627

VL - 20

SP - 56

EP - 64

JO - Journal of Computer and Systems Sciences International

JF - Journal of Computer and Systems Sciences International

SN - 1064-2307

IS - 4

ER -

ID: 73933443