The dislocation geometry of interphase boundaries
- 1 December 1982
- journal article
- research article
- Published by Taylor & Francis in Philosophical Magazine A
- Vol. 46 (6) , 951-969
- https://doi.org/10.1080/01418618208236943
Abstract
Bilby's (1955) theory of surface dislocations has been applied to the case of a general interphase boundary where the lattice misfit is formally relieved by discrete arrays of dislocations. The approach developed here derives the line directions and array spacings of the dislocations for any matrix relating the two lattices on either side of the boundary. Examples are given of the application of the derived formulae to particular interphase boundary problems.Keywords
This publication has 23 references indexed in Scilit:
- The application of surface dislocation theory to the f.c.c.–b.c.c. interfaceActa Crystallographica Section A, 1982
- Modelling the stress-strain curves of dual phase steelsScripta Metallurgica, 1981
- The role of the invariant line in the search for an optimum interphase boundary by O-lattice theoryScripta Metallurgica, 1981
- On the coincidence site lattice and DSC dislocation network model of high angle grain boundary structureScripta Metallurgica, 1980
- Computation of coincident and near-coincident cells for any two lattices – related DSC-1 and DSC-2 latticesActa Crystallographica Section A, 1977
- Note on a general analytical method to find a basis for the DSC lattice. Derivation of a basis for the CSLScripta Metallurgica, 1976
- O-Lattice calculation of an F.C.C.–B.C.C. interfacePhysica Status Solidi (a), 1974
- A study of optimal phase boundaries: the case of exsolved alkali feldsparsActa Crystallographica Section A, 1968
- The Bakerian Lecture, 1962 The structure of liquidsProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1964
- Continuous Distributions of Dislocations: Surface Dislocations and the Crystallography of Martensitic TransformationsProceedings of the Physical Society. Section B, 1956