AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |
Back to Blog
Glide reflection in lattice11/13/2023 Mislin, G.: Equivariant \(K\)-homology of the classifying space for proper actions. Michel, L., Zak, J.: Connectivity of energy bands in crystals. Mendez-Diez, S., Rosenberg, J.: \(K\)-theoretic matching of brane charges in S- and U-duality. Lück, W., Stamm, R.: Computations of \(K\)- and \(L\)-theory of cocompact planar groups. Kubota, Y.: Controlled topological phases and bulk-edge correspondence. Kubota, Y.: Notes on twisted equivariant K-theory for \(C^*\)-algebras. Kruthoff, J., de Boer, J., van Wezel, J., Kane, C.L., Slager, R.-J.: Topological classification of crystalline insulators through band structure combinatorics. Kopsky, V., Litvin, D.B., eds.: International Tables for Crystallography, Volume E: Subperiodic groups, E (5th ed.), Berlin, New York (2002) Kitaev, A.: Periodic table for topological insulators and superconductors. ![]() Kellendonk, J., Richter, T., Schulz-Baldes, H.: Edge current channels and Chern numbers in the integer quantum Hall effect. (ed.) Topics in noncommutative geometry, Clay Math. Karoubi, M.: Twisted bundles and twisted \(K\)-theory. Karoubi, M.: \(K\)-theory: an introduction. Hsieh, D., et al.: A tunable topological insulator in the spin helical Dirac transport regime. Hatsugai, Y.: Bulk-edge correspondence in graphene with/without magnetic field: Chiral symmetry, Dirac fermions and Edge states. Hatsugai, Y.: Chern number and edge states in the integer quantum Hall effect. Hannabuss, K., Mathai, V., Thiang, G.C.: T-duality simplifies bulk-boundary correspondence: the noncommutative case. Halperin, B.I.: Quantized Hall conductance, current-carrying edge states, and the existence of extended states in a two-dimensional disordered potential. Haldane, F.D.M.: Model for a quantum Hall effect without Landau levels: condensed-matter realization of the “parity anomaly”. Gomi, K., Thiang, G.C.: Crystallographic T-duality. Gomi, K.: A variant of \(K\)-theory and topological T-duality for real circle bundles. Gomi, K.: Twists on the torus equivariant under the 2-dimensional crystallographic point groups. Gohberg, I.C., Krein, M.G.: The basic propositions on defect numbers, root numbers and indices of linear operators. 124, 124–164 (2018)įang, C., Fu, L.: New classes of three-dimensional topological crystalline insulators: nonsymmorphic and magnetic. 50, 249–272 (1979)ĭe Nittis, G., Gomi, K.: The cohomological nature of the Fu–Kane–Mele invariant. Providence, RI (1996)ĭe Monvel, L.B.: On the index of Toeplitz operators of several complex variables. Springer, Berlin (1984)ĭavidson, K.R.: \(C^*\)-algebras by example. (ed.) Algebraic \(K\)-Theory, Number Theory, Geometry, and Analysis. 137, 211–217 (1969)Ĭonway, J.H., Friedrichs, O.D., Huson, D.H., Thurston, W.P.: On three-dimensional orbifolds and space groups. World Scientific, River Edge (2003)Ĭoburn, L.A.: The \(C^*\)-algebra generated by an isometry. (eds.) Geometrical and Topological Methods for Quantum Field Theory, pp. Nature 547, 298–305 (2017)īenameur, M.-T.: Noncommutative geometry and abstract integration theory. Springer, Berlin (1969)Ītiyah, M.F., Singer, I.M.: The index of elliptic operators I. ![]() (ed.) Lectures in Modern Analysis and Applications I. 2(19), 113–140 (1968)Ītiyah, M.F.: Algebraic topology and operators in Hilbert space. The possible cell shapes are parallelogram, rectangular, square, rhombic, and hexagonal ( Figure 12.21).Atiyah, M.F.: Bott periodicity and the index of elliptic operators. Lattices can be classified by the structure of a single lattice cell. To answer the question of how the point groups and the translation groups can be combined, we must look at the different types of lattices. B Hints and Answers to Selected Exercises.Additional Exercises: Error Correction for BCH Codes.Additional Exercises: Solving the Cubic and Quartic Equations.The Simplicity of the Alternating Group.Additional Exercises: Primality and Factoring.Multiplicative Group of Complex Numbers.Integer Equivalence Classes and Symmetries.
0 Comments
Read More
Leave a Reply. |