The Experts below are selected from a list of 5466 Experts worldwide ranked by ideXlab platform
Durmus Bozkurt - One of the best experts on this subject based on the ideXlab platform.
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another proof of pell identities by using the determinant of tridiagonal matrix
Applied Mathematics and Computation, 2012Co-Authors: Meral Yasar, Durmus BozkurtAbstract:Abstract In this paper, another proof of Pell identities is presented by using the determinant of tridiagonal matrix. It is calculated via the Laplace Expansion.
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another proof of pell identities by using the determinant of tridiagonal matrix
arXiv: Numerical Analysis, 2011Co-Authors: Meral Yasar, Durmus BozkurtAbstract:In this paper, another proof of Pell identities is presented by using the determinant of tridiagonal matrices. It is calculated via the Laplace Expansion.
Meral Yasar - One of the best experts on this subject based on the ideXlab platform.
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another proof of pell identities by using the determinant of tridiagonal matrix
Applied Mathematics and Computation, 2012Co-Authors: Meral Yasar, Durmus BozkurtAbstract:Abstract In this paper, another proof of Pell identities is presented by using the determinant of tridiagonal matrix. It is calculated via the Laplace Expansion.
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another proof of pell identities by using the determinant of tridiagonal matrix
arXiv: Numerical Analysis, 2011Co-Authors: Meral Yasar, Durmus BozkurtAbstract:In this paper, another proof of Pell identities is presented by using the determinant of tridiagonal matrices. It is calculated via the Laplace Expansion.
R.l. Aguiar - One of the best experts on this subject based on the ideXlab platform.
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Extending the Laplace Expansion method to the frequency response analysis of active RLC circuits
10th IEEE International Conference on Electronics Circuits and Systems 2003. ICECS 2003. Proceedings of the 2003, 2003Co-Authors: L.n. Alves, R.l. AguiarAbstract:This paper presents a method for structured and intuitive analysis of active RLC circuits, based on Laplace Expansion of the admittance matrix. The method can be applied to a wide variety of electronic circuits. The technique developed requires only the determination of DC driving point impedances (DPI) and transfer functions, used to specify the coefficients of the overall transfer function.
Aguiar R.l. - One of the best experts on this subject based on the ideXlab platform.
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Extending the Laplace Expansion method to the frequency response analysis of active RLC circuits
'Institute of Electrical and Electronics Engineers (IEEE)', 2024Co-Authors: Alves L. N., Aguiar R.l.Abstract:This paper presents a method for structured and intuitive analysis of active RLC circuits, based on Laplace Expansion of the admittance matrix. The method can be applied to a wide variety of electronic circuits. The technique developed requires only the determination of DC driving point impedances (DPI) and transfer functions, used to specify the coefficients of the overall transfer function. © 2003 IEEE
Alves L. N. - One of the best experts on this subject based on the ideXlab platform.
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Extending the Laplace Expansion method to the frequency response analysis of active RLC circuits
'Institute of Electrical and Electronics Engineers (IEEE)', 2024Co-Authors: Alves L. N., Aguiar R.l.Abstract:This paper presents a method for structured and intuitive analysis of active RLC circuits, based on Laplace Expansion of the admittance matrix. The method can be applied to a wide variety of electronic circuits. The technique developed requires only the determination of DC driving point impedances (DPI) and transfer functions, used to specify the coefficients of the overall transfer function. © 2003 IEEE