References
- Michel JP, Lacaze E, Alba M, et al. Optical gratings formed in thin smectic films frustrated on a single crystalline substrate. Phys Rev E. 2004;70(1):011709.
- Michel JP, Lacaze E, Goldmann M, et al. Structure of smectic defect cores: X-ray study of 8CB liquid crystal ultrathin films. Phys Rev Lett. 2006 Jan;96:027803.
- Zappone B, Lacaze E. Surface-frustrated periodic textures of smectic-A liquid crystals on crystalline surfaces. Phys Rev E. 2008 Dec;78:061704.
- Zappone B, Meyer C, Bruno L, et al. Periodic lattices of frustrated focal conic defect domains in smectic liquid crystal films. Soft Matter. 2012;8:4318–4326.
- Coursault D, Zappone B, Coati A, et al. Self-organized arrays of dislocations in thin smectic liquid crystal films. Soft Matter. 2016;12(3):678–688. Available from: https://pubs.rsc.org/en/content/articlelanding/2016/sm/c5sm02241j
- Zappone B, Lacaze E. One-dimensional patterns and topological defects in smectic liquid crystal films. Liq Cryst Rev. 2022;1–18. DOI:10.1080/21680396.2022.2076748
- Jeridi H, et al. Unique orientation of 1D and 2D nanoparticle assemblies confined in smectic topological defects. Soft Matter. 2022;18:4792–4802. DOI:10.1039/d2sm00376g.
- De Giorgi E, Ambrosio L. Un nuovo funzionale nel calcolo delle variazioni. Atti Accad Naz Lincei Rend Cl Sci Fis Mat Nat (8). 1988;82(2):199–210. (1989).
- Francfort GA, Marigo JJ. Revisiting brittle fracture as an energy minimization problem. J Mech Phys Solids. 1998;46(8):1319–1342.
- Ball JM, Bedford SJ. Discontinuous order parameters in liquid crystal theories. Mol Cryst Liq Cryst. 2015;612(1):1–23.
- Oseen CW. The theory of liquid crystals. Trans Faraday Soc. 1933;29:883–899.
- Leslie FM, Stewart IW, Nakagawa M. A continuum theory for smectic C liquid crystals. Mol Cryst Liq Cryst. 1991;198(1):443–454.
- de Gennes PG. An analogy between superconductors and smectics A. Solid State Commun. 1972;10(9):753–756.
- Chen JH, Lubensky T. Landau-Ginzburg mean-field theory for the nematic to smectic-C and nematic to smectic-A phase transitions. Phys Rev A. 1976;14(3):1202.
- Kléman M, Parodi O. Covariant elasticity for smectics A. J Phys. 1975;36(7–8):671–681.
- Han J, Luo Y, Wang W, et al. From microscopic theory to macroscopic theory: a systematic study on modeling for liquid crystals. Arch Ration Mech Anal. 2015;215(3):741–809.
- Ball JM. Mathematics and liquid crystals. Mol Cryst Liq Cryst. 2017;647(1):1–27.
- Ambrosio L, Fusco N, Pallara D. Functions of bounded variation and free discontinuity problems. New York: The Clarendon Press, Oxford University Press; 2000.
- Ambrosio L, Braides A. Functionals defined on partitions of sets of finite perimeter, I: integral representation and Γ-convergence. J Math Pures Appl. 1990;69:285–305.
- Ambrosio L. Existence theory for a new class of variational problems. Arch Rational Mech Anal. 1990;111(4):291–322.
- Ambrosio L, Braides A. Functionals defined on partitions in sets of finite perimeter II: semicontinuity, relaxation and homogenization. J Math Pures Appl. 1990;69:307–333.
- Caraballo D. BV-ellipticity and lower semicontinuity of surface energy of Caccioppoli partitions of ℝn. J Geom Anal. 2013;23:202–220.
- Ball JM, Canevari G, Stroffolini B. Analysis of a free discontinuity model for smectic thin films. To appear.
- Xia J, MacLachlan S, Atherton TJ, et al. Structural landscapes in geometrically frustrated smectics. Phys Rev Lett. 2021 Apr;126(17):177801.
- Pevnyi MY, Selinger JV, Sluckin TJ. Modeling smectic layers in confined geometries: order parameter and defects. Phys Rev E. 2014 Sep;90:032507.