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This classic book gives, in extensive tables, the irreducible representations of the crystallographic point groups and space groups. These are useful in studying the eigenvalues and eigenfunctions of a particle or quasi-particle in a crystalline solid. The theory is extended to the corepresentations of the Shubnikov groups.
International Series in Modern Applied Mathematics and Computer Science, Volume 10: Symmetry: Unifying Human Understanding provides a tremendous scope of “symmetry , covering subjects from fractals through court dances to crystallography and literature. This book discusses the limits of perfection, symmetry as an aesthetic factor, extension of the Neumann-Minnigerode-Curie principle, and symmetry of point imperfections in solids. The symmetry rules for chemical reactions, matching and symmetry of graphs, mosaic patterns of H. J. Woods, and bilateral symmetry in insects are also elaborated. This text likewise covers the crystallographic patterns, Milton's mathematical symbol of theodicy, symmetries of soap films, and gapon formalism. This volume is a good source for researchers and specialists concerned with symmetry.
Divided into two parts, the first half of this text covers all of the topics required for a complete understanding of the applications of group theory to solid state physics. It shows how symmetry arguments can be used to give detailed insight into the physical properties of crystals closely linked with structure.The second half of the book distinguishes it from other books on this subject by its treatment of symmetry properties of magnetic crystals at a level suitable for graduate students new to the field.
Site Symmetry in Crystals is the first comprehensive account of the group-theoretical aspects of the site (local) symmetry approach to the study of crystalline solids. The efficiency of this approach, which is based on the concepts of simple induced and band representations of space groups, is demonstrated by considering newly developed applications to electron surface states, point defects, symmetry analysis in lattice dynamics, the theory of second-order phase transitions, and magnetically ordered and non-rigid crystals. Tables of simple induced respresentations are given for the 24 most common space groups, allowing the rapid analysis of electron and phonon states in complex crystals with many atoms in the unit cell.
Pt. I. Elements of group theory. Tabular list of definitions -- pt. II. Symmetry in quantum mechanical systems. Examples of symmetry in quantum mechanical systems -- Matrix representation theory for finite groups -- Application to quantum mechanics -- Some results of the theory of continuous groups -- "Double" groups -- Permutation symmetry of many-particle wave functions -- The role of group theory in the coupling of states -- pt. III. Point symmetry and its consequences. Point groups -- Term splitting in crystal fields -- Additional methods in crystal field theory -- pt. IV. Translational symmetry of solids. Bravais lattices and Born-Von Karman boundary conditions -- Representations of cyclic groups -- Solid state "particles" -- Qualitative discussion of space groups -- pt. V. Special topics. Time reversal -- Jahn-Teller effect.
This book is about the underlying principles of symmetry, thermodynamics and electronic structure that pertain to crystalline solids. After years of teaching graduate students in the areas covered, the author has a good idea of what major notions of group theory and thermodynamics are useful to students of solid state chemistry, and of what fundamental concepts are necessary for a clear understanding. Thus the book deals with lattice symmetry, space groups, reciprocal space, Landau theory, X-ray diffraction, heterogeneous equilibria and simple band theory, in a rigorous and thorough treatment.