Mechanics of Solids
A Journal of Russian Academy of Sciences

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Issues > Archive of Issues > 2020-6 > pp.808-812

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Total articles in the database:		12804
In Russian (Изв. РАН. МТТ):		8044
In English (Mech. Solids):		4760

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Georgievskii D.V., "Second Order Linear Differential Operators over High Rank Tensor Fields," Mech. Solids. 55 (6), 808-812 (2020)
Year	2020	Volume	55	Number	6	Pages	808-812
DOI	10.3103/S0025654420060060
Title	Second Order Linear Differential Operators over High Rank Tensor Fields
Author(s)	Georgievskii D.V. (Lomonosov Moscow State University, Moscow, 119992 Russia; Ishlinsky Institute for Problems in Mechanics RAS, Moscow, 119526 Russia, georgiev@mech.math.msu.su)
Abstract	Tensor fields of arbitrary rank in multidimensional space are naturally extended to the concepts of divergence, gradient, curl, deformer operators, as well as their second-order superpositions. Two options for generalizing the rotor as an external product are presented. Differential operators of the second order that do not change the rank of the tensor to which they are applied are considered in detail. Square matrices are introduced, consisting of differential operators Div_(l)Grad_(k), Grad_(k)Div_(l), and their relationship is established. An explicit expression is written for the repeated operator rotor. All introduced generalized operators in particular cases agree in their properties with the corresponding classical operators in vector and tensor analysis.
Keywords	linear differential operator, divergence, gradient, rotor, Laplacian, deformer, tensor, rank, polyad, Levi-Civita symbol
Received	28 February 2020	Revised	11 March 2020	Accepted	30 March 2020
Link to Fulltext	https://link.springer.com/article/10.3103/S0025654420060060
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