weakly prime ternary subsemimodules of ternary semimodules
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abstract
in this paper we introduce the concept of weakly prime ternary subsemimodules of a ternary semimodule over a ternary semiring and obtain some characterizations of weakly prime ternary subsemimodules. we prove that if $n$ is a weakly prime subtractive ternary subsemimodule of a ternary $r$-semimodule $m$, then either $n$ is a prime ternary subsemimodule or $(n : m)(n : m)n = 0$. if $n$ is a $q$-ternary subsemimodule of a ternary $r$-semimodule $m$, then a relation between weakly prime ternary subsemimodules of $m$ containing $n$ and weakly prime ternary subsemimodules of the quotient ternary $r$-semimodule $m/n_{(q)}$ is obtained.
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Journal title:
journal of algebra and related topicsPublisher: university of guilan
ISSN 2345-3931
volume 2
issue 2 2014
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