Presentation	2008-03-07 Generalized Pascal Matrices and Inverses Using One-to-One Rational Polynomial s-z Transformations Tian-Bo Deng,
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Abstract(in English)	This paper proposes a one-to-one mapping between the coefficients of continuous-time (s-domain) and discretetime (z-domain) IIR transfer functions such that the s-domain numerator/denominator coefficients can be uniquely mapped to the z-domain numerator/denominator coefficients, and vice versa. The one-to-one mapping provides a firm basis for proving the inverses of the so-called generalized Pascal matrices from various first-order s-z transformations.
Keyword(in Japanese)	(See Japanese page)
Keyword(in English)	Generalized Pascal matrix / inverse Pascal matrix / continuous-time (CT) filter / discrete-time (DT) filter / first-order s-z transformation / one-to-one coefficient mapping
Paper #	CAS2007-160,SIP2007-235,CS2007-125
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Conference Information
Committee	CS
Conference Date	2008/2/29(1days)
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Paper Information
Registration To	Communication Systems (CS)
Language	ENG
Title (in Japanese)	(See Japanese page)
Sub Title (in Japanese)	(See Japanese page)
Title (in English)	Generalized Pascal Matrices and Inverses Using One-to-One Rational Polynomial s-z Transformations
Sub Title (in English)
Keyword(1)	Generalized Pascal matrix
Keyword(2)	inverse Pascal matrix
Keyword(3)	continuous-time (CT) filter
Keyword(4)	discrete-time (DT) filter
Keyword(5)	first-order s-z transformation
Keyword(6)	one-to-one coefficient mapping
1st Author's Name	Tian-Bo Deng
1st Author's Affiliation	Department of Information Science Faculty of Science, Toho University()
Date	2008-03-07
Paper #	CAS2007-160,SIP2007-235,CS2007-125
Volume (vol)	vol.107
Number (no)	531
Page	pp.pp.-
#Pages	6
Date of Issue