Document Zbl 0428.73095

The method of virtual power in continuum mechanics: Application to coupled fields. (English) Zbl 0428.73095

Acta Mech. 35, 1-70 (1980).

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MSC:

74F15	Electromagnetic effects in solid mechanics
74A15	Thermodynamics in solid mechanics
49S05	Variational principles of physics

Keywords:

application to coupled fields; principle of virtual power

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[1]	Mach, E.: The science of mechanics, 5th English ed., pp. 12-13, 96-99, 105-106. Lasalle, Ill.: Open Court Publ. Co. 1942.
[2]	Dijksterhuis, E. J.: The origins of classical mechanics from Aristotle to Newton, Critical problems in the history of science (Clagget, M. e.), pp. 163-184. Madison, Milwaukee: Univ. of Wisconsin Press. 1969.
[3]	Aristotle (Pseudo-), Quaestiones mechanicae, The law of the lever, English translation, in: Energy: Historical development of the concept (Benchmark Papers on Energy) (Bruce Lindsay, R. ed.), pp. 34-43. Stroudsburg, Pa.: Dowden, Hutchinson and Ross Inc. 1975.
[4]	Scott, W. L.: The conflict between atomism and conservation theory; 1644 to 1860. London-New York: Macdonald-Elsevier. 1970.
[5]	d’Alembert J. le Rond: Traité de dynamique. Paris: 1743.
[6]	Lindsay R. B., (ed.): Energy: Historical development of the concept. (Benchmark Papers on Energy.) Stroudsburg, Pa.: Dowden, Hutchinson and Ross Inc. 1975.
[7]	Stewart, G. C.: Coulomb and the evolution of physics and engineering in eighteencentury france. Princeton, N. J.: Princeton Univ. Press. 1971.
[8]	Gillispie, C. E.: Lazare carnot savant. Princeton, N. J.: Princeton Univ. Press. 1971.
[9]	Magie, W. F. (ed.): A source book in physics. New York: McGraw-Hill. 1935.
[10]	Germain, P.: La méthode des puissances virtuelles en mécanique des milieux continus-I: Théorie du second gradient. J. de mécanique12, 235-274 (1973). · Zbl 0261.73003
[11]	Maugin, G. A.: The foundations of the electrodynamics of non-linear continua. Prace Inst. Podstaw. Probl. Techniki, Polish Academy of Sciences, Warsaw, 1976.
[12]	Nayroles, B.: Operations algébriques en mécanique des structures. C. R. Acad. Sci. Paris273A, 1075-1078 (1971). · Zbl 0254.70011
[13]	Moreau, J. J.: On unilateral constraints: Friction and plasticity. New variational techniques in mathematical physics (CIME Lectures) Cremonese, Rome (1974) pp. 173-222.
[14]	Casal, P.: La théorie du second gradient et la capillarité. C. R. Acad. Sci. Paris274A, 1571-1574 (1972). · Zbl 0286.76004
[15]	Penfield, P., Haus, H. A.: Electrodynamics of moving media. Cambridge, Mass.: M.I.T Press. 1967.
[16]	Schwartz, L.: Théorie des distributions. Paris: Hermann. 1966.
[17]	Baumhauer, J. C., Tiersten, H. F., Nonlinear electrostatics equations for small fields superimposed on a bias. J. Acoust. Soc. Am.54, 1017-1034 (1973). · Zbl 0274.73058 · doi:10.1121/1.1914312
[18]	Boulanger, Ph., Mayne, G., van Geen, R.: Magneto-optical, electrooptical and photoelastic effects in an elastic polarizable and magnetizable isotropic continuum. Int. J. Solids Structures9, 1439-1464 (1973). · Zbl 0267.73066 · doi:10.1016/0020-7683(73)90052-8
[19]	Maugin, G. A.: A continuum theory of deformable ferrimagnetic bodies-I-field equations. J. Math. Phys.17, 1727-1738 (1976). · Zbl 0346.73062 · doi:10.1063/1.523101
[20]	Maugin, G. A.: A continuum theory of deformable ferrimagnetic bodies-II-thermothermodynamics, constitutive theory. J. Math. Phys.17, 1739-1751 (1976). · Zbl 0346.73063 · doi:10.1063/1.523102
[21]	Maugin, G. A.: Deformable dielectrics-II-voigt’s intramolecular force balance in elastic dielectrics. Arch. Mech. Stosow.29, No. 1, 143-159 (1977). · Zbl 0402.73090
[22]	Paglietti, A.: Mechanical and thermodynamical basis for theories of generalized continuous media. Int. J. Non-Linear Mech.9, 161-178 (1974). · Zbl 0303.73002 · doi:10.1016/0020-7462(74)90033-X
[23]	Germain, P.: Contribution à l’étude des milieux micropolaires et micromorphiques. Omaggio a Carlo Ferrari, Levrotto e Bella, Torino (1974), pp. 273-297.
[24]	Germain, P.: Duality and convection in continuum mechanics. In: Trends in applications of pure mathematics to mechanics (Fichera, G. ed.). 107-128. London: Pitman. 1976.
[25]	Eringen, A. C., (ed.): Continuum physics, Vol. IV. New York: Academic Press. 1976. · Zbl 0769.73004
[26]	Maugin, G. A.: Nonlocal theories or gradient-type theories. A matter of convenience Lecture at euromech colloquium. Nonlocal theories of materials. Warsaw, 1977 Arch. Mech. Stosow.31, 15-26 (1979). · Zbl 0424.73006
[27]	Toupin, R. A.: Theories of elasticity with couple stress. Arch. Rat. Mech. Anal.17, 85-112 (1964). · Zbl 0131.22001 · doi:10.1007/BF00253050
[28]	Eringen, A. C.: Theory of micropolar elasticity, Fracture, Vol. II (Liebowitz, H. ed.), 621-729. New York: Academic Press. 1968. · Zbl 0266.73004
[29]	Germain, P.: The method of virtual power in continuum mechanics-II-microstructure. S.I.A.M.J. Appl. Math.25, 556-575 (1973). · Zbl 0273.73061 · doi:10.1137/0125053
[30]	Truesdell, C. A., Noll, W.: The non-linear field theories of mechanics (Handbuch der Physik, Vol. III/3) (Flügge, S. ed.) Berlin-Heidelberg-New York: Springer. 1965. · Zbl 0779.73004
[31]	Duvaut, G., Lions, J.-L.: Les inéquations en mécanique et en physique. Paris: Dunod. 1972. · Zbl 0298.73001
[32]	Germain, P.: Cours de mécanique des milieux continus. Vol. I. Paris: Masson. 1973. · Zbl 0254.73001
[33]	Maugin, G. A.: Sur la dynamique des milieux déformables magnétisés avec spin magnétique-théorie classique. J. de Mécanique13, 75-96 (1974).
[34]	Maugin, G. A.: Formulation des lois de comportement en mécanique relativiste des milieux continus (mimeographed, 164p.), pp. 57, 68. Univ. Paris VI, Paris (1975).
[35]	Bourbaki, N.: Espaces vectoriels topologiques. Paris: Hermann. 1964.
[36]	Rockafellar, R. T.: Convex analysis. Princeton, N. J.: Princeton Univ. Press. 1970. · Zbl 0193.18401
[37]	Breuneval, J.: Principe des travaux virtuels et équations des coques. J. de Mécanique12, 137-149 (1973). · Zbl 0261.73055
[38]	Maugin, G. A.: On the foundations of the electrodynamics of deformable media with interactions. Lecture at the Symposium on Physical Fields in Material Media, Warsaw, Aug. 1975, printed in special issue of Lett. Appl. Engng. Sci.4, 13-17 (1976).
[39]	Paria, G.: Magnetoelasticity and magneto-thermo-elasticity (Advances in applied mechanics, Vol. 10). (Kuerti, G. ed.), pp. 73-112. New York: Academic Press. 1967.
[40]	Nowacki, W.: Dynamic problems in thermoelasticity (Translation from the Polish), Chap. VI. Leyden: Noordhoff; Warsaw: P. W. N. 1975.
[41]	Hughes, W. F., Young, F. J.: The electromagnetodynamics of fluids. New York: J. Wiley. 1966.
[42]	Mindlin, R. D.: Elasticity, piezoelectricity and crystal lattice dynamics. J. of Elasticity2, 217-282 (1972). · doi:10.1007/BF00045712
[43]	Melcher, J. R., Taylor, G. I.: Electrohydrodynamics: A Review of interfacial shear stresses. Ann. Rev. of Fluid Mechanics (Sears, W., Van Dyke, M., eds.), Vol. I. Palo Alto: 1969.
[44]	Tiersten, H. F.: Coupled magnetomechanical equations for magnetically saturated insulators. J. Math. Phys.5, 1298-1318 (1964). · Zbl 0131.42803 · doi:10.1063/1.1704239
[45]	Tiersten, H. F.: On the nonlinear equations of thermo-electroelasticity. Int. J. Engng. Sci.9, 587-604 (1971). · Zbl 0225.73082 · doi:10.1016/0020-7225(71)90062-0
[46]	Toupin, R. A.: A dynamical theory of dielectrics. Int. J. Engng. Sci.1, 101-126 (1963). · doi:10.1016/0020-7225(63)90027-2
[47]	Tiersten, H. F., Tsai, C. F.: On the interactions of the electromagnetic field with heat conducting deformable Insulators. J. Math. Phys.13, 361-378 (1972). · doi:10.1063/1.1665987
[48]	de Lorenzi, H. G., Tiersten, H. F.: On the interaction of the electromagnetic field with heat conducting deformable semiconductors. J. Math. Phys.16, 938-957 (1975). · doi:10.1063/1.522600
[49]	Maugin, G. A.: Deformable dielectrics-III-A model of interactions. Arch. Mech. Stosow.29, No. 2 251-258 (1977). · Zbl 0402.73091
[50]	Tiersten, H. F.: Variational principle for saturated magnetoelastic insulators. J. Math. Phys.6, 779-787 (1965). · doi:10.1063/1.1704334
[51]	Maugin, G. A., Eringen, A. C.: Deformable magnetically saturated media-I-field equations. J. Math. Phys.13, 143-155 (1972). · doi:10.1063/1.1665947
[52]	Maugin, G. A., Eringen, A. C.: Polarized elastic materials with electronic spin-A relativistic approach. J. Math. Phys.13, 1777-1788 (1972). · doi:10.1063/1.1665909
[53]	Suhubi, E. S.: Elastic dielectrics with polarization gradients. Int. J. Engng. Sci.7, 993-997 (1969). · Zbl 0179.55904 · doi:10.1016/0020-7225(69)90089-5
[54]	Parkus, H.: Magneto- und Elektroelastizität. Zeit. angew. Math. Mech.53, T18-T24 (1972). · Zbl 0256.73046
[55]	Askar, A., Lee, P. C. Y., Cakmak, A. S.: Lattice dynamics approach to the theory of elastic dielectrics with polarization gradients. Phys. Rev.B 1, 3525-3537 (1970). · doi:10.1103/PhysRevB.1.3525
[56]	Lax, M., Nelson, D. F.: Linear and nonlinear electrodynamics in elastic anisotropic dielectrics. Phys. Rev.B4, 3694-3731 (1971). · doi:10.1103/PhysRevB.4.3694
[57]	Lax, M., Nelson, D. F.: Electrodynamics of elastic pyroelectrics. Phys. Rev.B13, 1759-1769 (1976). · doi:10.1103/PhysRevB.13.1759
[58]	Nelson, D. F., Lax, M.: Linear elasticity and piezoelectricity in pyroelectrics. Phys. Rev.B13, 1785-1796 (1976). · doi:10.1103/PhysRevB.13.1785
[59]	Nelson, D. F.: Electrodynamics of elastic dielectrics. (Mimeographed Lecture Notes, Princeton Univ., Dept. of Electrical Engng., Spring 1976.) (To be published in book form.)
[60]	Maugin, G. A.: Quasi-electrostatics of electrically polarized continua. Lett. Appl. Engng. Sci.2, 293-306 (1974).
[61]	Collet, B., Maugin, G. A.: Sur l’électrodynamique des milieux continus avec interactions. C. R. Acad. Sci. Paris.279B, 379-382 (1974).
[62]	Maugin, G. A., Collet, B.: Thermodynamique des milieux continus électromagnétiques avec interactions. C. R. Acad. Sci. Paris.274B, 439-442 (1974).
[63]	Maugin, G. A.: On a theory of elastic dielectrics including quadrupols. Univ. Paris VI (1974). (Unpublished.)
[64]	Collet, B., Maugin, G. A.: Couplage magnétoélastique de surface dans les matériaux ferromagnétiques. C. R. Acad. Sci. Paris280 A, 1641-1444 (1975). · Zbl 0321.73072
[65]	Collet, B.: Sur une théorie des premiers et seconds gradients des milieux continus électromagnétiques. Thèse de 3ème cycle. Univ. Paris VI, Paris (1976).
[66]	Maugin, G. A.: On the spin relaxation in deformable ferromagnets. Physica81A, 454-468 (1975).
[67]	Maugin, G. A.: Deformable dielectrics-I-field equations for a dielectric made of several molecular species. Arch. Mech. Stosow.28, 679-692 (1976). · Zbl 0381.73095
[68]	de Groot, S. R., Suttorp, L. G.: Foundations of electrodynamics. Amsterdam: North-Holland. 1972.
[69]	de Groot, S. R.: The maxwell equations. Studies in Statistical Mechanics, Vol. IV. Amsterdam: North-Holland. 1969. · Zbl 0177.57402
[70]	Lorentz, H. A.: The theory of electrons. Reprint of 2nd edition. New York: Dover. 1952.
[71]	Dixon, R. C., Eringen, A. C.: A dynamical theory of polar Elastic dielectrics. Int. J. Engng. Sci.3, 359-398 (1965). · doi:10.1016/0020-7225(65)90059-5
[72]	Maugin, G. A., Eringen, A. C.: On the equations of the electrodynamics of deformable bodies of finite extent. J. de Mécanique16, 101-147 (1977). · Zbl 0356.73079
[73]	Truesdell, C. A., Toupin, R. A.: The classical field theories. In: Handbuch der Physik, Vol. III/1 (Flügge, S. ed.). Berlin-Göttingen-Heidelberg: Springer. 1960.
[74]	Maugin, G. A.: Micromagnetism. In: Continuum Physics, Vol. III (Eringen, A. C. ed.), pp. 213-312. New York: Academic Press. 1976.
[75]	Brown, W. F.: Micromagnetics. New York: Interscience-J. Wiley. 1963.
[76]	Maugin, G. A.: A note on micromagnetics at high temperature. Appl. Phys.11, 185-186 (1976). · doi:10.1007/BF00920602
[77]	Maugin, G. A.: Sur l’objectivité des champs électromagnétiques dans les milieux déformables. C. R. Acad. Sci. Paris289A (1979, in the press).
[78]	Alblas, J. B.: The cosserat continua with electronic spin. In: Mechanics of Generalized Continua (IUTAM Symposium, Stuttgart, 1967). (Kröner, E., ed.), pp. 350-354. Berlin-Heidelberg-New York: Springer. 1968.
[79]	Alblas, J. B.: Continuum mechanics of media with internal structure. In: Symposia Mathematica, Vol. I, pp. 229-251. New York: Academic Press. 1968.
[80]	Jenkins, J. T.: A theory of magnetic fluids. Arch. Rat. Mech. Anal.46, 42-60 (1972). · Zbl 0241.76014 · doi:10.1007/BF00251867
[81]	Lenz, J.: The Oriented elastic continuum as a model for the magnetoelastic body. Int. J. Solids Structures8, 1235-1245 (1972). · Zbl 0247.73104 · doi:10.1016/0020-7683(72)90077-7
[82]	Brown, W. F.: Magnetoelastic interactions. New York: Springer. 1966.
[83]	Landau, L. D., Lifshitz, E. M.: On a theory of the dispersion of magnetic permeability in ferromagnetic bodies. Phys. Z. Sowjet.8, 153 (1935). · Zbl 0012.28501
[84]	Minnaja, N.: Micromagnetics at high Temperature. Phys. Rev.B 1, 1151-1159 (1970). · doi:10.1103/PhysRevB.1.1151
[85]	Maugin, G. A.: Sur les fluides relativistes à spin. Ann. Inst. Henri Poincaré20, 41-68 (1974). · Zbl 0289.76062
[86]	Eringen, A. C.: Theory of nonlocal electromagnetic elastic solids. J. Math. Phys.14, 733-740 (1973). · Zbl 0257.73066 · doi:10.1063/1.1666387
[87]	Muller, I.: A thermodynamic theory of mixtures of fluids. Arch. Rat. Mech. Anal.28, 1-39 (1968). · Zbl 0157.56703 · doi:10.1007/BF00281561
[88]	Liu I-Shih, Muller, I.: On the thermodynamic and thermostatics of fluids in electromagnetic fields. Arch. Rat. Mech. Anal.46, 149-176 (1972). · Zbl 0252.76072
[89]	Benach, R.: Towards a rational dynamics of plasmas. Thesis, Techn. Hogeschool Eindhoven (mimeographed, 255p.), Eindhoven, 1974. · Zbl 0286.76002
[90]	Woods, L. C.: The thermodynamics of fluid systems. Oxford: Clarendon Press. 1975. · Zbl 0296.16006
[91]	Vittoria, C., Craig, J. N., Bailey, G. C.: General dispersion law in a ferromagnetic cubic magnetoelastic conductor. Phys. Rev.B 10, 3945-3956 (1974). · doi:10.1103/PhysRevB.10.3945
[92]	Akhiezer, A. I., Bar’yakhtar, V. G., Peletminskii, S. V.: Spin waves (Translation from the Russian). Amsterdam: Nord-Holland. 1983.
[93]	Tiersten, H. F.: Thickness Vibrations of saturated magnetoelastic plates. J. Appl. Phys.36, 2250-2259 (1965). · doi:10.1063/1.1714459
[94]	Strauss, W.: Magnetoelastic properties of yttrium-iron-garnet. In: Physical Acoustics, Vol. 4 (Mason, W. P. ed.), pp. 211-268. New York: Academic Press. 1968.
[95]	Maugin, G. A., Eringen, A. C.: Deformable magnetically saturated media-II-constitutive theory. J. Math. Phys.13, 1334-1347 (1972). · doi:10.1063/1.1666143
[96]	Eringen, A. C., Maugin, G. A.: Electromagnetics of continua. In: Lecture Notes, Princeton University (1976), Chap. IX: Elastic Ferromagnets. (To be published in book form.)
[97]	Alblas, J. B.: Electro-magneto-elasticity. In: Topics in Applied Continuum Mechanics (Zeman, J. L., Ziegler, F. eds.), pp. 71-114. Wien-New York: Springer. 1974.
[98]	van de Ven, A. A. F.: Interaction of electromagnetic and elastic fields in solids. Ph. D. Thesis, Techn. Univ. Eindhoven (mimeographed) Eindhoven. 1975. · Zbl 0297.73075
[99]	Rezende, S. M., Morgenthaler, F. R.: Magnetoelastic wave propagation in timevarying magnetic Fields. J. Appl. Phys.40, 524-545 (1969). · doi:10.1063/1.1657433
[100]	Maugin, G. A.: Remarks on dissipative processes in the continuum theory of micromagnetics. J. Phys. Gen. Phys.A 5, 1550-1562 (1972). · doi:10.1088/0305-4470/5/11/002
[101]	Gilbert, T. L.: A phenomenological theory of ferromagnetism. Ph. D. Thesis, Ill. Inst. of Techn., 1956.
[102]	Gurevich, A. G.: Magnetic resonance in ferrites and antiferromagnets, p. 410. Moscow: Nauka. 1973. (In Russian.)
[103]	Korchagin, Yu. A., Khleborros, R. G., Chistyakov, N. S.: Spin-wave resonance spectrum in a thin ferromagnetic layer with mixed boundary conditions. Soviet Phys. Solid State14, 1826-1827 (1973).
[104]	Tiersten, H. F.: Surface coupling in magnetoelastic insulators, Surface mechanics, pp. 120-143. New York: Amer. Soc. Mech. Eng. 1969.
[105]	Boulanger, Ph.: Une théorie de l’effet faraday dans un diélectrique viscoélastique isotrope polarisable et magnétisable. Rheol. Acta12, 120-143 (1973). · doi:10.1007/BF01635091
[106]	Tokuoka, T., Kobayashi, M.: Mechano-electromagnetic waves in a linear isotropic elastic dielectric material in a constant magnetic field of any direction. Lett. Appl. Engng. Sci.2, 203-212 (1974).
[107]	Kobayashi, M., Tokuoka, T.: Mechanico-electromagnetic waves in an elastic dielectric with cubic symmetry in a magnetic field. Trans. Japan Soc. Aero. Space Sci.18, 41-52 (1975).
[108]	Hutter, K.: Wave propagation and attenuation in paramagnetic and soft-ferromagnetic materials. Int. J. Engng. Sci.13, 1067-1084 (1975). · doi:10.1016/0020-7225(75)90046-4
[109]	Hutter, K., Pao, Y. H.: A dynamical theory for magnetizable elastic solids with thermal and electrical conductions. J. of Elasticity4, 89-114 (1974). · Zbl 0286.73081 · doi:10.1007/BF00045660
[110]	Pao, Y. H., Hutter, K.: Electrodynamics for moving elastic solids and viscous fluids, Proc. I.E.E.E.63, 1011-1021 (1975).
[111]	Rivlin, R. S.: Comments on a paper by M. F. McCarthy. Arch. Rat. Mech. Anal.46, 61-65 (1972). · doi:10.1007/BF00251868
[112]	Lee, P. C. Y., Haines, D. W.: Piezoelectric crystals and electro-elasticity. In: R. D. Mindlin and Applied Mechanics (Hermann, G., ed.), pp. 227-253. New York: Pergamon. 1974.
[113]	Gazis, D. C., Chung Gang: Lattice theories and continuum mechanics. In: R. D. Mindlin and Applied Mechanics (Hermann, G., ed.), pp. 255-289. New York: Pergamon. 1974.
[114]	Ramachandran, G., Ramaseshan, S.: Crystal optics, diffraction. In: Handbuch der Physik, Vol. XXV/1 (Flügge, S. ed.), Berlin-Göttingen-Heidelberg: Springer. 1961.
[115]	Cullwick, E. G.: Electromagnetism and relativity. London: Longmans, Green and Co. 1957. · Zbl 0077.20601
[116]	Demiray, H., Eringen, A. C.: On the constitutive equations of polar elastic dielectrics. Lett. Appl. Engng. Sci.1, 517-527 (1973).
[117]	Maugin, G. A.: Dynamics of nematic liquid crystals. Univ. Paris VI (1974). (Unpublished report.)
[118]	de Gennes, P. G.: The physics of liquid crystals, London: Oxford Univ. Press. 1974. · Zbl 0295.76005
[119]	Leslie, F. M.: Some constitutive equation for liquid crystals. Arch. Rat. Mech. Anal.28, 265-283 (1968). · Zbl 0159.57101 · doi:10.1007/BF00251810
[120]	Eriksen, J. L.: Some magnetohydrodynamic effects in liquid crystals. Arch. Rat. Mech. Anal.23, 265-283 (1966/67).
[121]	Maugin, G. A.: A phenomanological theory of ferroliquids. Int. J. Engng. Sci.16, 1029-1044 (1978). · Zbl 0431.76092 · doi:10.1016/0020-7225(78)90059-9
[122]	Green, A. E.: Micro-materials and multipolar continuum mechanics. Int. J. Engng. Sci.3, 533-537 (1965). · doi:10.1016/0020-7225(65)90033-9
[123]	Blinowski, A.: Gradient description of capillarity phenomena in multicomponent fluids. Arch. Mech. Stosow.27, 273-292 (1975). · Zbl 0323.76079
[124]	Planck, M.: A survey of physical theory, pp. 69-81. New York: 1960. (English Translation.)
[125]	Sedov, L. I.: Variational methods of constructing models of continuous media, in: Irreversible Aspects of Continuum Mechanics (IUTAM Symposium, Vienna, 1966). (Parkus, H., Sedov, L. I. eds.) Wien-New York: Springer. 1968.
[126]	Sedov, L. I.: Models of continuous media with internal degrees of freedom. Priklad. matem. Mekhan.32, 771-805 (1968). · Zbl 0185.54002
[127]	Sedov, L. I.: Mécanique des milieux continus. Vol. I, pp. 504-529. Moscow: Mir. 1975. (In French.)
[128]	Maugin, G. A.: Micromagnetism and polar media. Ph. D. Thesis, Princeton Univ. (mimeographed, 294p., April 1971), pp. 9-15.
[129]	Einstein, A.: Zur Elektrodynamik bewegter Körper. Ann. der Phys.17, 891-921 (1905). · JFM 36.0920.02 · doi:10.1002/andp.19053221004
[130]	Maugin, G. A.: Magnetized deformable media in general relativity. Ann. Inst. Henri Poincaré15, 275-302 (1971). · Zbl 0234.73037

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