Determination of near-coincident cells for hexagonal crystals. Related DSC lattices

Deformation twinning in hexagonal crystals is often considered as a way to palliate the lack of independent slip systems. This mechanism might be either exacerbated or shut down in small-scale crystals whose mechanical behavior can significantly deviate from bulk materials. Here, we show that sub-micron beryllium fibers initially free of dislocation and tensile tested in-situ in a transmission electron microscope (TEM) deform by a {1012} 1011 twin thickening. The propagation speed of the twin boundary seems to be entirely controlled by the nucleation of twinning dislocations directly from the surface. The shear produced is in agreement with the repeated lateral motion of twinning dislocations. We demonstrate that the activation volume (V) associated with the twin boundary propagation can be retrieved from the measure of the twin boundary speed as the stress decreases as in a classical relaxation mechanical test. The value of V ≈ 8.3 ± 3.3 × 10 −29 m 3 is comparable to the value expected from surface nucleation. This text is a revised version of the article published in Acta Materialia, 96 (2015) 57-65

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“…• perfect twin misorientation [57]. Indeed, the observed twin boundary presents a misorientation ≈ 85.2…”

Section: Dislocation Nucleationmentioning

confidence: 94%

In situ TEM study of twin boundary migration in sub-micron Be fibers

Mompiou

Legros

Ensslen³

et al. 2015

Acta Materialia

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“…1(a), which corresponds to the Σ7 coincidence site lattice within one of the standard classification schemes for GBs 26,27 , meaning that one out of 7 lattice sites coincide in an overlay of the two grains. It belongs to the set of energetically favorably GBs according to various models, 28 and occurs frequently in real systems see, e.g.…”

Section: Sample Preparation and Experimental Setupmentioning

confidence: 99%

Magnetoresistance of antidot lattices with grain boundaries

Klinkhammer

Heinzel

et al. 2008

Phys. Rev. B

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The magnetotransport properties of antidot lattices containing artificially designed grain boundaries have been measured. We find that the grain boundaries broaden the commensurability resonances and displace them anisotropically. These phenomena are unexpectedly weak but differ characteristically from isotropic, Gaussian disorder in the antidot positions. The observations are interpreted in terms of semiclassical trajectories which tend to localize along the grain boundaries within certain magnetic field intervals. Furthermore, our results indicate how the transport through superlattices generated by self-organizing templates may get influenced by grain boundaries.

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“…rotations generating CSL's in hexagonal lattices (Warrington, 1975;Fortes & Smith, 1976;Bonnet, Cousineau & Warrington, 1981;Hag~ge, Nouet & Delavignette, 1980;Bleris, Nouet, Hag~ge & Delavignette, 1982). This last paper, which will be referred to as BNHD, uses an axis-angle description in lattice coordinates for the rotations, which turns out to be convenient for deriving the coincidence rotations.…”

Section: Introductionmentioning

confidence: 99%

Fundamentals for the description of hexagonal lattices in general and in coincidence orientation

Grimmer¹,

Warrington²

1987

Acta Cryst Sect A

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The connection between the rotation matrix in hexagonal lattice coordinates and an angle-axis quadruple is given. The multiplication law of quadruples is derived. It corresponds to multiplying two matrices and gives the effect of two successive rotations. The relation is given between two quadruples that describe the same relative orientation of two lattices owing to their hexagonal symmetry; a unique standard description of the relative orientation is proposed. The restrictions satisfied by rotations generating coincidence site lattices (CSL's) are derived for any value of the axial ratio p = c~ a. It is shown that the law for cubic lattices, where the multiplicity 2 of the CSL is equal to the lowest common denominator of the elements of the rotation matrix, does not always hold for hexagonal lattices. A generalization of this law to lattices of arbitrary symmetry is given and another, quicker, method of determining £ for hexagonal lattices is derived. Finally, convenient algorithms are described for determining bases of the CSL and the DSC lattice.

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Determination of near-coincident cells for hexagonal crystals. Related DSC lattices

Cited by 84 publications

References 9 publications

In situ TEM study of twin boundary migration in sub-micron Be fibers

In situ TEM study of twin boundary migration in sub-micron Be fibers

Magnetoresistance of antidot lattices with grain boundaries

Fundamentals for the description of hexagonal lattices in general and in coincidence orientation

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