Add to ORKGNeither International Tables for Crystallography (ITC) nor available crystal-lography textbooks state explicitly which of the 14 Bravais types of lattices are special cases of others, although ITC contains the information necessary to derive the result in two ways, considering either the symmetry or metric properties of the lattices. The first approach is presented here for the first time, the second has been given by Michael Klemm in 1982. Metric relations between conventional bases of special and general lattice types are tabulated and applied to continuous equi-translation phase transitions
AbstractA review is presented of main results of the phenomenological theory of phase transitions ob...
Phase transitions in which crystalline solids undergo structural changes present an interesting prob...
Crystallography is a branch of physics that studies the properties of crystals. The atoms that make ...
Bravais lattices are the most fundamental building blocks of crystallography. They are classified in...
Results are sketched which were obtained while attempting to understand some classical concepts of c...
This book is a clear and comprehensive introduction to the field of crystallography. It includes dis...
The number of Bravais lattices (or lattice types) in three-dimensional space is well known to be 14 ...
SIGLEAvailable from British Library Document Supply Centre- DSC:D33861/81 / BLDSC - British Library ...
The most important symmetry arguments to be considered in the analysis of structural phase transitio...
Abstract. Ascher’s tables of equitranslational phase transitions in crystals are augmented with tabl...
Bloch’s theorem used to tessellate the space into a periodic modular pat-tern. An important conditio...
The analysis of microstructure, for instance in shape-memory alloys, is largely based on the knowled...
Contains fulltext : 33549.pdf (publisher's version ) (Closed access
The relationship between macroscopic shape and atomic-level structure of crystals. Lattice types, sp...
Algorithms for quantifying the differences between two lattices are used for Bravais lattice determi...
AbstractA review is presented of main results of the phenomenological theory of phase transitions ob...
Phase transitions in which crystalline solids undergo structural changes present an interesting prob...
Crystallography is a branch of physics that studies the properties of crystals. The atoms that make ...
Bravais lattices are the most fundamental building blocks of crystallography. They are classified in...
Results are sketched which were obtained while attempting to understand some classical concepts of c...
This book is a clear and comprehensive introduction to the field of crystallography. It includes dis...
The number of Bravais lattices (or lattice types) in three-dimensional space is well known to be 14 ...
SIGLEAvailable from British Library Document Supply Centre- DSC:D33861/81 / BLDSC - British Library ...
The most important symmetry arguments to be considered in the analysis of structural phase transitio...
Abstract. Ascher’s tables of equitranslational phase transitions in crystals are augmented with tabl...
Bloch’s theorem used to tessellate the space into a periodic modular pat-tern. An important conditio...
The analysis of microstructure, for instance in shape-memory alloys, is largely based on the knowled...
Contains fulltext : 33549.pdf (publisher's version ) (Closed access
The relationship between macroscopic shape and atomic-level structure of crystals. Lattice types, sp...
Algorithms for quantifying the differences between two lattices are used for Bravais lattice determi...
AbstractA review is presented of main results of the phenomenological theory of phase transitions ob...
Phase transitions in which crystalline solids undergo structural changes present an interesting prob...
Crystallography is a branch of physics that studies the properties of crystals. The atoms that make ...