Thiele型张量连分式插值及其在张量指数计算中的应用

doi:10.12066/j.issn.1007-2861.2182

Journal of Shanghai University（Natural Science Edition） ›› 2021, Vol. 27 ›› Issue (4): 650-658.doi: 10.12066/j.issn.1007-2861.2182

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Thiele-type tensor continued fraction interpolation and its application in the computation of the tensor exponential function

JIANG Xianglong(), GU Chuanqing

College of Sciences, Shanghai University, Shanghai 200444, China

Received:2019-06-19 Online:2021-08-20 Published:2021-07-22
Contact: JIANG Xianglong E-mail:jiangxl@shmtu.edu.cn

Abstract

CLC Number:

O241.6

JIANG Xianglong, GU Chuanqing. Thiele-type tensor continued fraction interpolation and its application in the computation of the tensor exponential function[J]. Journal of Shanghai University（Natural Science Edition）, 2021, 27(4): 650-658.

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References 12

[1]	Neto E A D S. The exact derivative of the exponential of an unsymmetric tensor[J]. Computer Methods in Applied Mechanics and Engineering, 2001, 190:2377-2383. doi: 10.1016/S0045-7825(00)00241-3
[2]	Gu C Q. Bivariate Thiele-type matrix valued rational interpolants[J]. Journal of Computational and Applied Mathematics, 1997, 80:71-82. doi: 10.1016/S0377-0427(97)00006-X
[3]	Gu C Q. Thiele-type and Largrange-type generalized inverse rational interpolation for rectangular complex matrices[J]. Linear Algebra and Its Applications, 1999, 295:7-30. doi: 10.1016/S0024-3795(99)00036-1
[4]	Gu C Q. Generalized inverse matrix Padé approximation on the basis of scalar products[J]. Linear Algebra and Its Applications, 2001, 322:141-167. doi: 10.1016/S0024-3795(00)00230-5
[5]	Gu C Q. A practical two-dimensional Thiele-type matrix Padé approximation[J]. IEEE Trans-actions on Automat Control, 2003, 48:2259-2263.
[6]	Hackbusch W. Tensor spaces and numerical tensor calculus[M]. Berlin: Springer-Verlag, 2012.
[7]	Kilmer M E, Braman K, Hao N, et al. Third-order tensors as operators on matrices: a theoretical and computational framework with applications in imaging[J]. SIAM Journal on Matrix Analysis and Applications, 2013, 34:148-172. doi: 10.1137/110837711
[8]	Kofidis E, Regalia P A. Tensor decompositions and applications[J]. SIAM Review, 2009, 51:455-500. doi: 10.1137/07070111X
[9]	Gu C Q, Liu Y. The tensor Padé-type approximant with application in computing tensor exponential function[J]. Journal of Function Spaces, 2018, 2018:2835175.
[10]	顾传青, 黄逸铮, 陈之兵. 广义逆张量Padé逼近的连分式递推算法[J]. 控制与决策, 2019, 34(8):1702-1708.
	Gu C Q, Huang Y Z, Chen Z B. A continued fractional recurrence algorithm for generalized inverse tensor Padé approximation[J]. Control and Decision, 2019, 34(8):1702-1708.
[11]	顾传青, 唐鹏飞, 陈之兵. 计算张量指数函数的广义逆张量$\varepsilon$-算法[J]. 自动化学报, 2020, 46(4):744-751.
	Gu C Q, Tang P F, Chen Z B. Generalized inverse tensor $\varepsilon$-algorithm for computing tensor exponential function[J]. Acta Automatica Sinica, 2020, 46(4):744-751.
[12]	Qi L Q. Eigenvalues of a real supersymmetric tensor[J]. Journal of Symbolic Computation, 2005, 40:1302-1324. doi: 10.1016/j.jsc.2005.05.007

Thiele-type tensor continued fraction interpolation and its application in the computation of the tensor exponential function

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