Results 221 to 230 of about 48,254 (265)
Machine learning-based prediction of compressive energy absorption in shoe soles with different features. [PDF]
Sci RepMohammadi MM, Nourani A.
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Improving S-Curve Bias Through Joint Compensation of HPA and Filter Distortions. [PDF]
Sensors (Basel)Chen L, Yang Y, Xiong T, Chen L, Liu Y.
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A shape-controlled non-symmetric quaternary refinement scheme. [PDF]
Sci RepAshraf P, Younus S, Kalsoom A, Younas J.
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Transversely isotropic hyperelastic laws for 2D FEM modeling of human thoracic spine ligaments. [PDF]
Sci RepWiczenbach T +5 more
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ON J-UNITARY MATRIX POLYNOMIALS
Journal of Mathematical Sciences, 2022zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ephremidze, Lasha +2 more
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Fast methods for resumming matrix polynomials and Chebyshev matrix polynomials
Journal of Computational Physics, 2004zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Liang, Wanzhen +5 more
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Orthogonal Matrix Laurent Polynomials
Mathematical Notes, 2006zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Afrika Matematika, 2013
The author introduces a new type of matrix polynomial, namely the Rice matrix polynomial \(H_n(A,B,z)\), where \(A,B\) are square complex matrices with \(B+kI\) invertible for all integers \(k\geq0\), by means of the hypergeometric matrix function. Its convergence properties, radius of convergence and an integral form are derived.
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The author introduces a new type of matrix polynomial, namely the Rice matrix polynomial \(H_n(A,B,z)\), where \(A,B\) are square complex matrices with \(B+kI\) invertible for all integers \(k\geq0\), by means of the hypergeometric matrix function. Its convergence properties, radius of convergence and an integral form are derived.
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2003
This chapter is devoted to proving a matrix version of Krein’s Theorem. The proof relies on methods that are different from those used in the scalar case.
Robert L. Ellis, Israel Gohberg
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This chapter is devoted to proving a matrix version of Krein’s Theorem. The proof relies on methods that are different from those used in the scalar case.
Robert L. Ellis, Israel Gohberg
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