Lattice of subgroups
From Wikipedia, the free encyclopedia
In mathematics, the lattice of subgroups of a group G is the lattice whose elements are the subgroups of G, with the partial order relation being set inclusion. In this lattice, the join of two subgroups is the subgroup generated by their union, and the meet of two subgroups is their intersection.
Lattice theoretic information about the lattice of subgroups can sometimes be used to infer information about the original group. For instance, a group is locally cyclic if and only if its lattice of subgroups is distributive.
Contents |
[edit] Example
The dihedral group Dih4 has ten subgroups, counting itself and the trivial subgroup. Five of the eight group elements generate subgroups of order two, and two others generate the same cyclic group C4. In addition, there are two groups of the form C2×C2, generated by pairs of order-two elements. The lattice formed by these ten subgroups is shown in the illustration.
[edit] See also
[edit] References
- Baer, Reinhold; Hausdorff, Felix (1939). "The significance of the system of subgroups for the structure of the group". American Journal of Mathematics 61 (1): 1–44. DOI:10.2307/2371383.
- Rottlaender, Ada (1928). "Nachweis der Existenz nicht-isomorpher Gruppen von gleicher Situation der Untergruppen". Mathematische Zeitschrift 28 (1): 641–653. DOI:10.1007/BF01181188.
- Schmidt, Roland (1994). Subgroup Lattices of Groups. Expositions in Math, vol. 14, de Gruyter. Review by Ralph Freese in Bull. AMS 33 (4): 487–492.
- Suzuki, Michio (1951). "On the lattice of subgroups of finite groups". Transactions of the American Mathematical Society 70 (2): 345–371. DOI:10.2307/1990375.
- Suzuki, Michio (1956). Structure of a Group and the Structure of its Lattice of Subgroups. Berlin: Springer Verlag.
- Yakovlev, B. V. (1974). "Conditions under which a lattice is isomorphic to a lattice of subgroups of a group". Algebra and Logic 13 (6). DOI:10.1007/BF01462952.
