On isotropic tensors

Harold Jeffreys

doi:10.1017/S0305004100047587

Extract

1. An isotropic tensor is one the values of whose components are unaltered by any rotation of rectangular axes (with metric σi(dxi)2). Those up to order 4 in 2 and 3 dimensions have many applications. The results suggest a general theorem for tensors of order m in n dimensions, that any isotropic tensor can be expressed as a linear combination of products of δ and є tensors, where δij = 1 if i = j and 0 otherwise, and is 0 if any two of the i1 to in are equal, 1 if i1…in is an even permutation of 1, 2, 3, …,n, and – 1 if it is an odd permutation.

References

REFERENCES

(1)Jeffreys, H.Cartesian tensors (Cambridge University Press, 1931).Google Scholar

(2)Jeffreys, H. and Jeffreys, B. S.Methods of mathematical physics (Cambridge University Press, 1946).Google Scholar

(3)Jeffreys, H. and Vicente, R. O.Acad. Roy. Belg., Bull. Cl. Sci. (5), 53 (1967), 926–33.Google Scholar

(4)Littlewood, D. E.The theory of group characters (1940).Google Scholar

(5)Pastori, Maria. Atti. Acc. Naz. Lincei Rendiconti, Cl. Sci. Fis. Mat. Natur. VI, 12 (1930), 374–379.Google Scholar

(6)Pastori, Maria. Atti. Ace. Naz. Lincei Rendiconti, Cl. Sci. Fia. Mat. Natur. VI, 12 (1930), 499–502.Google Scholar

(7)Pastori, Maria. Atti. Acc. Naz. Lincei Rendiconti, Cl. Sci. Fis. Mat. Natur. VI, 13 (1931), 119–114.Google Scholar

(8)Pastori, Maria. Atti. Ace. Naz. Lincei Rendiconti, Cl. Sci. Fia. Mat. Natur. VI, 17 (1933), 439–443.Google Scholar

(9)Pastori, Maria. Scritti matematici offerti a Luigi Berzolari, pp. 223–238. (Pavia, 1936.)Google Scholar

(10) Pastori, Maria. Boll. Un. Mat. Ital. 2 (1939).Google Scholar

(11) Weyl, H.The classical groups. (1939), pp. 52–66, 137–163.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Ogden, R. W. 1974. On isotropic tensors and elastic moduli. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 75, Issue. 3, p. 427.

Power, E. A. and Thirunamachandran, T. 1974. Circular dichroism: A general theory based on quantum electrodynamics. The Journal of Chemical Physics, Vol. 60, Issue. 9, p. 3695.

Healy, W P 1975. On the isotropic averaging of fifth-order cartesian tensors. Journal of Physics A: Mathematical and General, Vol. 8, Issue. 9, p. L87.

Adu-Gyamfi, D. and Felderhof, B.U. 1975. On the propagation of light in media with higher multipole densities. Physica A: Statistical Mechanics and its Applications, Vol. 81, Issue. 2, p. 295.

Andrews, D. L. and Thirunamachandran, T. 1977. On three-dimensional rotational averages. The Journal of Chemical Physics, Vol. 67, Issue. 11, p. 5026.

Adu-Gyamfi, D. 1978. On the electric quadrupole density of an isotropic non-polar fluid. Physica A: Statistical Mechanics and its Applications, Vol. 93, Issue. 3-4, p. 553.

Andrews, D. L. and Ghoul, W. A. 1982. Irreducible fourth-rank Cartesian tensors. Physical Review A, Vol. 25, Issue. 5, p. 2647.

Appleby, P. G. Duffy, B. R. and Ogden, R. W. 1987. On the classification of isotropic tensors. Glasgow Mathematical Journal, Vol. 29, Issue. 2, p. 185.

Andrews, David L. and Blake, Nick P. 1988. Laser-induced molecular orientation effects in vibrational resonance-Raman spectroscopy. Chemical Physics, Vol. 122, Issue. 2, p. 169.

Ruchon, T. Vallet, M. Chauvat, D. and Le Floch, A. 2006. A dipole interaction model for magnetochiral birefringence. The Journal of Chemical Physics, Vol. 125, Issue. 8,

Jespersen, Sune Nørhøj 2012. Equivalence of double and single wave vector diffusion contrast at low diffusion weighting. NMR in Biomedicine, Vol. 25, Issue. 6, p. 813.

Jespersen, Sune Nørhøj Lundell, Henrik Sønderby, Casper Kaae and Dyrby, Tim B. 2013. Orientationally invariant metrics of apparent compartment eccentricity from double pulsed field gradient diffusion experiments. NMR in Biomedicine, Vol. 26, Issue. 12, p. 1647.

Hansen, Brian Lund, Torben E. Sangill, Ryan and Jespersen, Sune Nørhøj 2013. Experimentally and computationally fast method for estimation of a mean kurtosis. Magnetic Resonance in Medicine, Vol. 69, Issue. 6, p. 1754.

Ford, J. S. and Andrews, D. L. 2014. One- and two-photon absorption in solution: The effects of a passive auxiliary beam. The Journal of Chemical Physics, Vol. 141, Issue. 3,

Kjølby, B.F. Khan, A.R. Chuhutin, A. Pedersen, L. Jensen, J.B. Jakobsen, S. Zeidler, D. Sangill, R. Nyengaard, J.R. Jespersen, S.N. and Hansen, B. 2016. Fast diffusion kurtosis imaging of fibrotic mouse kidneys. NMR in Biomedicine, Vol. 29, Issue. 12, p. 1709.

Williams, Mathew D. Bradshaw, David S. and Andrews, David L. 2016. Symmetry analysis of Raman scattering mediated by neighboring molecules. The Journal of Chemical Physics, Vol. 145, Issue. 18,

Hansen, Brian Lund, Torben E. Sangill, Ryan Stubbe, Ebbe Finsterbusch, Jürgen and Jespersen, Sune Nørhøj 2016. Experimental considerations for fast kurtosis imaging. Magnetic Resonance in Medicine, Vol. 76, Issue. 5, p. 1455.

Ee, June-Haak Jung, Dong-Won Kim, U-Rae and Lee, Jungil 2017. Combinatorics in tensor-integral reduction. European Journal of Physics, Vol. 38, Issue. 2, p. 025801.

Hansen, Brian and Jespersen, Sune N. 2017. Recent Developments in Fast Kurtosis Imaging. Frontiers in Physics, Vol. 5, Issue. ,

Andrews, David 2018. Symmetries, Conserved Properties, Tensor Representations, and Irreducible Forms in Molecular Quantum Electrodynamics. Symmetry, Vol. 10, Issue. 7, p. 298.

Download full list

Article contents

On isotropic tensors

Extract

Access options

References

REFERENCES

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

On isotropic tensors

Extract

Access options

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests