IDEALIZATION OF QUASI MULTIPLICATION SUBMODULE ON LOCAL MODULE
Let ???? is a module over ring ????. Module ???? is called multiplication module if every submodule of ???? is formed by ????????. Next there is theory about prime submodule that generalize multiplication module to weak multiplication module. Module ???? is called weak multiplication module if ev...
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| Format: | Theses |
| Language: | Indonesia |
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| Online Access: | https://digilib.itb.ac.id/gdl/view/34756 |
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| Institution: | Institut Teknologi Bandung |
| Language: | Indonesia |
| Summary: | Let ???? is a module over ring ????. Module ???? is called multiplication module if every
submodule of ???? is formed by ????????. Next there is theory about prime submodule
that generalize multiplication module to weak multiplication module. Module ????
is called weak multiplication module if every prime submodule of ???? is formed by
[????: ????]????, with [????: ????] is the residual ideal. Then there is defined a set ????(????) and
support of a module. This is used in module that almost multiplication or called
quasi multiplication module. Module ???? is called quasi multiplication module if
????(????) = ???????? for every ???? in support of module ????. In conclusion, every
multiplication module is quasi multiplication module, and every quasi
multiplication module is weak multiplication module. Meanwhile, there is method
of simplification submodule problem to ideal that is called idealization of a
module. This is obtained by constructing a set ????(+)???? with some addition and
multiplication operations to be a ring, with 0(+)???? is an ideal of ring ????(+)????.
There is also simplification theory that makes into local problems that is
localization theory. By localization theory in a prime ideal ???? of ????, it can be
constructed a local module ???????? and local ring ????????. In this thesis, will be proven that
a module ???? over ring ???? is quasi multiplication module if and only if the
localization module ???????? is also quasi multiplication module over local ring ???????? for
every ???? prime ideal in ????. Moreover, idealization of quasi multiplication
submodule on local module is a quasi multiplication ideal. |
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