Difference between revisions of "Weber indices"
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<font color="blue">Indices de Weber</font> (''Fr''). <font color="green">Índices de Weber | <font color="blue">Indices de Weber</font> (''Fr''). <font color="green">Índices de Weber | ||
− | </font> (''Sp''). <font color="black"> Indici di Weber</font> (''It''). <Font color="purple"> ウェーバー指数</font> | + | </font> (''Sp''). <font color="black"> Indici di Weber</font> (''It''). <Font color="purple"> ウェーバー指数</font> (''Ja''). |
For trigonal and hexagonal crystals, the [[Miller indices]] are conveniently replaced by the [[Bravais-Miller indices]] which make reference to a four-axes setting. For lattice directions, a similar extension to a four-axes axial setting exists, known as the '''Weber indices''', ''UVTW''. | For trigonal and hexagonal crystals, the [[Miller indices]] are conveniently replaced by the [[Bravais-Miller indices]] which make reference to a four-axes setting. For lattice directions, a similar extension to a four-axes axial setting exists, known as the '''Weber indices''', ''UVTW''. | ||
− | Let '''A'''<sub>1</sub>,'''A'''<sub>2</sub>,'''A'''<sub>3</sub>,'''C''' be the four hexagonal axes, written as capital | + | Let '''A'''<sub>1</sub>, '''A'''<sub>2</sub>, '''A'''<sub>3</sub>, '''C''' be the four hexagonal axes, written as capital letters to avoid any possible confusion with the rhombohedral axes '''a'''<sub>1</sub>, '''a'''<sub>2</sub>, '''a'''<sub>3</sub>, and let be ''uvw'' and ''UVTW'' the indices of a direction with respect to '''A'''<sub>1</sub>, '''A'''<sub>2</sub>, '''C''' or '''A'''<sub>1</sub>, '''A'''<sub>2</sub>,'''A'''<sub>3</sub>, '''C''' respectively. For a given direction the following identity must hold: |
''u'''''A'''<sub>1</sub> + ''v'''''A'''<sub>2</sub> + ''w'''''C''' = ''U'''''A'''<sub>1</sub> + ''V'''''A'''<sub>2</sub> + ''T'''''A'''<sub>3</sub> + ''W'''''C'''. | ''u'''''A'''<sub>1</sub> + ''v'''''A'''<sub>2</sub> + ''w'''''C''' = ''U'''''A'''<sub>1</sub> + ''V'''''A'''<sub>2</sub> + ''T'''''A'''<sub>3</sub> + ''W'''''C'''. | ||
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Now, because in the two-dimensional (001) plane only two of the three axes are linearly independent, the following identity can be established: | Now, because in the two-dimensional (001) plane only two of the three axes are linearly independent, the following identity can be established: | ||
− | '''A'''<sub>1</sub> + '''A'''<sub>2</sub> + '''A'''<sub>3</sub> = 0 | + | '''A'''<sub>1</sub> + '''A'''<sub>2</sub> + '''A'''<sub>3</sub> = 0 → '''A'''<sub>3</sub> = -('''A'''<sub>1</sub> + '''A'''<sub>2</sub>). |
A similar relation holds for the Weber indices: | A similar relation holds for the Weber indices: | ||
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''u'' = ''U''-''T''; ''v'' = ''V''-''T''; ''w'' = ''W'' | ''u'' = ''U''-''T''; ''v'' = ''V''-''T''; ''w'' = ''W'' | ||
− | ''U'' + ''V'' + ''T'' = 0 | + | ''U'' + ''V'' + ''T'' = 0 → ''T'' = -(''U''+''V'') |
so that: | so that: | ||
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To find the opposite relations, one has simply to subtract the second equation from the first multiplied by two and vice versa: | To find the opposite relations, one has simply to subtract the second equation from the first multiplied by two and vice versa: | ||
− | 2''u''-''v'' = 3''U'' | + | 2''u''-''v'' = 3''U'' → ''U'' = (2''u''-''v'')/3<br> |
− | -''u''+2''v'' = 3''V'' | + | -''u''+2''v'' = 3''V'' → ''V'' = (2''v''-''u'')/3<br> |
''T'' = -(''U''+''V'') = -(''u''+''v'')/3. | ''T'' = -(''U''+''V'') = -(''u''+''v'')/3. | ||
Revision as of 11:24, 20 May 2017
Indices de Weber (Fr). Índices de Weber (Sp). Indici di Weber (It). ウェーバー指数 (Ja).
For trigonal and hexagonal crystals, the Miller indices are conveniently replaced by the Bravais-Miller indices which make reference to a four-axes setting. For lattice directions, a similar extension to a four-axes axial setting exists, known as the Weber indices, UVTW.
Let A1, A2, A3, C be the four hexagonal axes, written as capital letters to avoid any possible confusion with the rhombohedral axes a1, a2, a3, and let be uvw and UVTW the indices of a direction with respect to A1, A2, C or A1, A2,A3, C respectively. For a given direction the following identity must hold:
uA1 + vA2 + wC = UA1 + VA2 + TA3 + WC.
Now, because in the two-dimensional (001) plane only two of the three axes are linearly independent, the following identity can be established:
A1 + A2 + A3 = 0 → A3 = -(A1 + A2).
A similar relation holds for the Weber indices:
U + V + T = 0.
Substituting the above identities, one immediately gets:
uA1 + vA2 + wC = UA1 + VA2 - T(A1 + A2 ) + WC
uA1 + vA2 + wC = (U-T)A1 + (V-T)A2 + WC
u = U-T; v = V-T; w = W
U + V + T = 0 → T = -(U+V)
so that:
u = 2U+V; v = U+2V; w = W
To find the opposite relations, one has simply to subtract the second equation from the first multiplied by two and vice versa:
2u-v = 3U → U = (2u-v)/3
-u+2v = 3V → V = (2v-u)/3
T = -(U+V) = -(u+v)/3.
The Weber indices of the direction perpendicular to a lattice plane are the same as the Bravais-Miller indices of that plane.