Abstract:

Get an associative circle with R unit and get M a right R-module.  N, a submodule of M. If Z2(N)=N is, the submodule of N to M is called the S-complete. S-integrating submodules are defined as two of the S-covered submodules defined by the help of single modules.  In this study, generally, S-integrating submodules have shown that the S-But class, which is a class of short full series, which is defined with the help of S-integrating submodules, is not an authentic class. The smallest self class that includes the S-But class determined and the structure of the elements of this class is determined through the submodules. There are some kinds of kinds of kinds of kinds of kinds of kinds of kinds of kinds of kind. Also, on the variable C-range, According to its class, the modules that are projective have been determined to be straight modules.

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