Socle
978-613-2-36276-6
6132362762
92
2010-08-23
34.00 €
eng
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Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. In mathematics, the term socle has several related meanings. In the context of a module M over a ring R, the socle of M is the sum of the minimal non-trivial submodules of M. It is denoted Soc(M). In particular, a module is semisimple if and only if Soc(M) = M. So the socle of a module could also be defined as the unique maximal semi-simple submodule. If R is a finite dimensional unital algebra and M a finitely generated R-module then the socle consists precisely of the elements annihilated by the radical of R.In the context of group theory, the socle of a group G, denoted Soc(G), is the subgroup generated by the minimal non-trivial normal subgroups of G. The socle is a direct product of minimal normal subgroups. As an example, consider the cyclic group Z12 with generator u, which has two minimal normal subgroups, one generated by u 4 and the other by u 6. Thus the socle of Z12 is the group generated by u 4 and u 6, which is just the group generated by u 2.
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