Abstract
In this paper, a unified approach for various extended inverses of tensors, the generalized bilateral inverse of tensors via Einstein products, is introduced and we show that a number of known generalized tensor inverses can be regarded as special cases of this idea. Some characterizations of the CMP, DMP, and MPD inverse of tensors by using Einstein products are provided. The notion of generalized bilateral inverses’ dual and self-duality are investigated. In addition, the bilateral inverse solutions for singular linear tensor equations are studied.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Beckmann CF, Smith SM (2005) Tensorial extensions of independent component analysis for multisubject FMRI analysis. Neuroimage 25(1):294–311
Behera R, Nandi AK, Sahoo JK (2020) Further results on the Drazin inverse of even-order tensors. Numer Linear Algebra Appl 27(5):2317
Brazell M, Li N, Navasca C, Tamon C (2013) Solving multilinear systems via tensor inversion. SIAM J Matrix Anal Appl 34(2):542–570
Bu C, Zhang X, Zhou J, Wang W, Wei Y (2014) The inverse, rank and product of tensors. Linear Algebra Appl 446:269–280
Cyganek B, Gruszczyński S (2014) Hybrid computer vision system for drivers’ eye recognition and fatigue monitoring. Neurocomputing 126:78–94
Du H-M, Wang B-X, Ma H-F (2019) Perturbation theory for core and core-ep inverses of tensor via Einstein product. Filomat 33(16):5207–5217
Einstein A (2007) The foundation of the general theory of relativity. Ann Phys 49(7):769–822
Eldén L (2007) Matrix methods in data mining and pattern recognition. SIAM
Ji J, Wei Y (2018) The Drazin inverse of an even-order tensor and its application to singular tensor equations. Comput Math Appl 75(9):3402–3413
Kheirandish E, Salemi A (2023) Generalized bilateral inverses. J Comput Appl Math 428:115137
Ma H, Li N, Stanimirović PS, Katsikis VN (2019) Perturbation theory for Moore-Penrose inverse of tensor via Einstein product. Comput Appl Math 38:1–24
Mehdipour M, Salemi A (2018) On a new generalized inverse of matrices. Linear Multilinear Algebra 66(5):1046–1053
Panigrahy K, Mishra D (2022) Extension of Moore-Penrose inverse of tensor via Einstein product. Linear Multilinear Algebra 70(4):750–773
Panigrahy K, Behera R, Mishra D (2020) Reverse-order law for the Moore-Penrose inverses of tensors. Linear Multilinear Algebra 68(2):246–264
Rabanser S, Shchur O, Günnemann S (2017) Introduction to tensor decompositions and their applications in machine learning. arXiv preprint arXiv:1711.10781
Sahoo JK, Behera R, Stanimirović PS, Katsikis VN, Ma H (2020) Core and core-ep inverses of tensors. Comput Appl Math 39(1):9
Sahoo JK, Behera R, Stanimirović PS, Katsikis VN (2020) Computation of outer inverses of tensors using the QR decomposition. Comput Appl Math 39(3):1–20
Stanimirović PS, Ćirić M, Katsikis VN, Li C, Ma H (2020) Outer and (b, c) inverses of tensors. Linear Multilinear Algebra 68(5):940–971
Sun L, Zheng B, Bu C, Wei Y (2016) Moore-Penrose inverse of tensors via Einstein product. Linear Multilinear Algebra 64(4):686–698
Sun L, Zheng B, Wei Y, Bu C (2018) Generalized inverses of tensors via a general product of tensors. Front Math China 13:893–911
Wang Y, Wei Y (2022) Generalized eigenvalue for even order tensors via Einstein product and its applications in multilinear control systems. Comput Appl Math 41(8):419
Wang B, Du H, Ma H (2020) Perturbation bounds for DMP and CMP inverses of tensors via Einstein product. Comput Appl Math 39(1):1–17
Wang X, Che M, Mo C, Wei Y (2023) Solving the system of nonsingular tensor equations via randomized Kaczmarz-like method. J Comput Appl Math 421:114856
Wei Y, Stanimirovic P, Petkovic M (2018) Numerical and symbolic computations of generalized inverses. World Scientific
Weiyang D, Yimin W (2016) Theory and computation of tensors. Elsevier, Academic Press, Amsterdam, Boston, London, New York, Oxford, Paris, San Diego, San Francisco, Singapore, Sydney, Tokyo
Zhao Y, Yang LT, Zhang R (2017) A tensor-based multiple clustering approach with its applications in automation systems. IEEE Trans Ind Inform 14(1):283–291
Author information
Authors and Affiliations
Corresponding author
Ethics declarations
Conflict of interest
There is no conflict of interest in the manuscript.
Additional information
Communicated by Yimin Wei.
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
Springer Nature or its licensor (e.g. a society or other partner) holds exclusive rights to this article under a publishing agreement with the author(s) or other rightsholder(s); author self-archiving of the accepted manuscript version of this article is solely governed by the terms of such publishing agreement and applicable law.
About this article
Cite this article
Kheirandish, E., Salemi, A. Generalized bilateral inverses of tensors via Einstein product with applications to singular tensor equations. Comp. Appl. Math. 42, 343 (2023). https://doi.org/10.1007/s40314-023-02483-8
Received:
Revised:
Accepted:
Published:
DOI: https://doi.org/10.1007/s40314-023-02483-8