@article{RCP25_1978__26__45_0, author = {Kl\'eman, Maurice and Michel, Louise}, title = {Spontaneous {Breaking} of {Euclidean} {Invariance} and {Classification} of {Topologically} {Stable} {Defects} and {Configurations} of {Crystals} and {Liquid} {Crystals}}, journal = {Les rencontres physiciens-math\'ematiciens de Strasbourg -RCP25}, note = {talk:4}, pages = {45--48}, publisher = {Institut de Recherche Math\'ematique Avanc\'ee - Universit\'e Louis Pasteur}, volume = {26}, year = {1978}, language = {en}, url = {http://archive.numdam.org/item/RCP25_1978__26__45_0/} }
TY - JOUR AU - Kléman, Maurice AU - Michel, Louise TI - Spontaneous Breaking of Euclidean Invariance and Classification of Topologically Stable Defects and Configurations of Crystals and Liquid Crystals JO - Les rencontres physiciens-mathématiciens de Strasbourg -RCP25 N1 - talk:4 PY - 1978 SP - 45 EP - 48 VL - 26 PB - Institut de Recherche Mathématique Avancée - Université Louis Pasteur UR - http://archive.numdam.org/item/RCP25_1978__26__45_0/ LA - en ID - RCP25_1978__26__45_0 ER -
%0 Journal Article %A Kléman, Maurice %A Michel, Louise %T Spontaneous Breaking of Euclidean Invariance and Classification of Topologically Stable Defects and Configurations of Crystals and Liquid Crystals %J Les rencontres physiciens-mathématiciens de Strasbourg -RCP25 %Z talk:4 %D 1978 %P 45-48 %V 26 %I Institut de Recherche Mathématique Avancée - Université Louis Pasteur %U http://archive.numdam.org/item/RCP25_1978__26__45_0/ %G en %F RCP25_1978__26__45_0
Kléman, Maurice; Michel, Louise. Spontaneous Breaking of Euclidean Invariance and Classification of Topologically Stable Defects and Configurations of Crystals and Liquid Crystals. Les rencontres physiciens-mathématiciens de Strasbourg -RCP25, Conférences de : A. Andreotti, A. Koranyi, J.L. Lebowitz, L. Michel et R. Teman, Tome 26 (1978), Exposé no. 4, 4 p. http://archive.numdam.org/item/RCP25_1978__26__45_0/
1 J. Math. Phys. (N.Y.) 7, 1218 (1966); | Zbl
,J. Math. Phys. (N.Y.) 9, 1762 (1968). | MR | Zbl
and ,2 Pis'ma Zh. Eksp. Teor. Fiz. 21, 91 (1975) [JETP Lett, 21, 42 (1975)].
, , and ,3 Pis'ma Zh. Eksp. Teor. Fiz. 21, 94 (1975) [JETP Lett. 21, 43 (1975)].
and ,4 Phys. Lett. 59B, 85 (1975).
, , , and ,5 J. Phys. (Paris), Lett. 38, L99 (1977),
,6 J. Phys. (Paris), Lett. 37, L149 (1976).
and ,7 We disagrée with Trends in Application of Pure Mathématics to Méchanics, edited by G. Fichera (Pitman, New York, 1976), conceraing his point of view for the homotopic classification of crystal defects. | Zbl
, in8
, in Proceedings of the Sixth International Colloquium Group Theoretical Methods in Physics, Tübingen, West Germany, 1977 (to be published).9 J. Phys, (Paris), Lett. 38, L195 (1977),
, , and ,10 Study of singularities in ordered Systems by homotopic topology methods" (to be published).
and , "11 J. Phys, (Paris), Lett. 38, L67 (1977).
,12 J. Phys. (Paris), Lett. 39, L29 (1977).
and ,13
, senior the sis, Princeton University (unpublished).14 J. Phys. (Paris) 38, 887 (1977).
and ,15 Boundary conditions for textures and defects" (to be published),
, "16 Phys. Rev. Lett. 38, 508 (1977), to connote nonsingular non-topologically-stable configurations (eg., S = 1 lines in the nematics, 4π rotation iines in superfluid He3-A phase). There is at the présent présent time some laxity in terminology, in that physicists tend to call textures what Finkelstein called kinks. We propose to use "configuration," because the words kinks and textures have both been used extensively for a long time with a very précise meaning in the physics of dislocations [a kink being a spécial type of accident on a line of dislocation and a texture being an exten-sive word to connote an assembly of defects in, e.g., J. Friedel, Dislocations (Pergamon, Oxford, 1964)].
has coined the name kinks for non-singular topologically stable configurations. The ter m of texture has been introduced by P. W. Andersen and G. Toulouse,17 Commun. Math. Phys. 27, 195 (1972). | MR | Zbl
, , , and ,18 R and Z are, respectively, the additive group of the real numbers and the integers. For the other groups we use the notation of and , Quantum Méchantes (Pergamon, New York, 1977), 3rd éd., Chap. 12.
19 Phys. Lett. 24A, 256 (1967).
and ,This pattern was predicted by Zh. Eksp. Teor. Fiz. 32, 1442 (1957) [JETP Lett. 5, 1174 (1957)],
,but with a square lattice while the observed hexagonal one was proposed by Phys. Rev. 133A, 1226 (1964).
, and ,20 Annu, Rev. Phys. Chem. 25, 79 (1974).
and ,21 The Topology of Fibre Bundles (Princeton Univ. Press, Princeton, N. J., 1957). | MR | Zbl
,22 The topoiogical space of a semidirect product of groups is a topoiogical product of the group spaces. In such a product we can omit contractible factors Rk since their homotopy is trivial and the homotopy groups of a topoiogical product are direct products of the homotopy group of the factors.
23 La Topologie des Espaces Représentatifs des Groupes de Lie (Hermann, Paris, 1936). | JFM | Zbl
,24 Proc. Nat. Acad, Sci. U.S.A. 40, 586 (1954). | MR | Zbl
,25 Leçons de Cristallographie (Berger-Levrault, Paris, 1929).
,26 Pramana 9, 471 (1977). They claim that this phase formed by a benzene-hexa-n -alkanoate belongs to case III of Table I: .
, , and ,27
, , , and , in Proceedings of the Europe an Congress on Smectics, Madonna di Campiglio, January, 1978 (unpublished). They have observed the phase of some hexa-n-oxytriphenylene and they do not exclude the possibility that it could be a nematic with symmetry group .28
, to be published.