| 1. | Meaning two Y 3 + ions generate one vacancy on the anionic sublattice.
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| 2. | Suppose an M ion leaves the M sublattice, leaving the X sublattice unchanged.
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| 3. | Suppose an M ion leaves the M sublattice, leaving the X sublattice unchanged.
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| 4. | In particular, since normal subgroups permute with each other, they form a modular sublattice.
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| 5. | The rigid ion sublattice of AdSIC has structure channels where mobile ions of opposite sign migrate.
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| 6. | Then, each ideal in R defines a sublattice of \ Z ^ n called ideal lattice.
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| 7. | Furthermore, every finite lattice is isomorphic to a sublattice of the subgroup lattice of some finite group.
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| 8. | Indeed, this particular lattice contains the forbidden " pentagon " " N " 5 as a sublattice.
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| 9. | Since " K " is generated by copies of subgroups that are homomorphic images of SU ( 2 ) corresponding to sublattice.
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| 10. | Each of the two individual atom types forms a sublattice which is HCP-type ( short for " hexagonal close-packed " ).
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