Streamline Image Analysis: a new tool for investigating defects in nematic liquid crystals
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Andrea Sanna | Bartolomeo Montrucchio | Amelia Carolina Sparavigna | Alfredo Strigazzi | A. Sanna | B. Montrucchio | A. Strigazzi
[1] R. Jones. A New Calculus for the Treatment of Optical Systems. IV. , 1942 .
[2] Director configuration of planar solitons in nematic liquid crystals , 1997, cond-mat/9709172.
[3] Amelia Carolina Sparavigna,et al. A novel order transition inside the nematic phase of trans -4-hexylcyclohexane-1-carboxylic acid discovered by image processing , 1998 .
[4] F. Nabarro,et al. Dislocations in solids , 1979 .
[5] Han-Wei Shen. Using line-integral convolution to visualize dense vector fields , 1998 .
[6] Amelia Carolina Sparavigna,et al. Saddle-splay and mechanical instability in nematics confined to a cylindrical annular geometry , 1993 .
[7] I. Sobol. On the distribution of points in a cube and the approximate evaluation of integrals , 1967 .
[8] J. Nehring,et al. On the schlieren texture in nematic and smectic liquid crystals , 1972 .
[9] Amelia Carolina Sparavigna,et al. Surface transition in a nematic layer with reverse pretilt , 1992 .
[10] Lavrentovich,et al. Focal conic domains with positive Gaussian curvature and saddle-splay rigidity of smectic L alpha phases. , 1992, Physical review. A, Atomic, molecular, and optical physics.
[11] Eduard Gröller,et al. Fast oriented line integral convolution for vector field visualization via the Internet , 1997 .
[12] Louis Michel,et al. SYMMETRY DEFECTS AND BROKEN SYMMETRY. CONFIGURATIONS - HIDDEN SYMMETRY , 1980 .
[13] Amelia Carolina Sparavigna,et al. A new image processing method for enhancing the detection sensitivity of smooth transitions in liquid crystals , 1998 .
[14] F. C. Frank,et al. I. Liquid crystals. On the theory of liquid crystals , 1958 .
[15] P. E. Cladis,et al. Non-singular disclinations of strength S = + 1 in nematics , 1972 .
[16] C. Oseen,et al. The theory of liquid crystals , 1933 .
[17] Brian Cabral,et al. Imaging vector fields using line integral convolution , 1993, SIGGRAPH.
[18] A. N. Bogdanov,et al. Inhomogeneous two-dimensional structures in liquid crystals , 1998 .
[19] N. D. Mermin,et al. The topological theory of defects in ordered media , 1979 .
[20] Lisa K. Forssell,et al. Using Line Integral Convolution for Flow Visualization: Curvilinear Grids, Variable-Speed Animation, and Unsteady Flows , 1995, IEEE Trans. Vis. Comput. Graph..
[21] S. Chandrasekhar. Liquid Crystals: Cholesteric liquid crystals , 1992 .
[22] Doane,et al. Surface elastic and molecular-anchoring properties of nematic liquid crystals confined to cylindrical cavities. , 1992, Physical review. A, Atomic, molecular, and optical physics.
[23] Victoria Interrante,et al. Visualizing 3D Flow , 1998, IEEE Computer Graphics and Applications.
[24] B. Bahadur,et al. Liquid Crystals — Applications and Uses: (Volume 1) , 1990 .
[25] Doane,et al. Curvature-induced configuration transition in confined nematic liquid crystals. , 1993, Physical review letters.
[26] David L. Kao,et al. A New Line Integral Convolution Algorithm for Visualizing Time-Varying Flow Fields , 1998, IEEE Trans. Vis. Comput. Graph..
[27] Robert B. Meyer,et al. On the existence of even indexed disclinations in nematic liquid crystals , 1973 .