Radical of a module

Let R be a ring and M a left R-module. A submodule N of M is called maximal or cosimple if the quotient M/N is a simple module. The radical of the module M is the intersection of all maximal submodules of M,

${\displaystyle \mathrm {rad} (M)=\bigcap \{N\mid N{\mbox{ is a maximal submodule of M}}\}\,}$

Equivalently,

${\displaystyle \mathrm {rad} (M)=\sum \{S\mid S{\mbox{ is a superfluous submodule of M}}\}\,}$

These definitions have direct dual analogues for soc(M).

• In addition to the fact rad(M) is the sum of superfluous submodules, in a Noetherian module rad(M) itself is a superfluous submodule.
• A ring for which rad(M) ={0} for every right R module M is called a right V-ring.
• For any module M, rad(M/rad(M)) is zero.
• M is a finitely generated module if and only if the cosocle M/rad(M) is finitely generated and rad(M) is a superfluous submodule of M.

• Socle (mathematics)
• Jacobson radical

• Alperin, J.L.; Rowen B. Bell (1995). Groups and representations. Springer-Verlag. p. 136. ISBN 0-387-94526-1.
• Anderson, Frank Wylie; Kent R. Fuller (1992). Rings and Categories of Modules. Springer-Verlag. ISBN 978-0-387-97845-1.