| 一类有限半格的自同态半环 |
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| 引用本文: | 韩 金,邵 勇.一类有限半格的自同态半环[J].计算机工程与应用,2019,55(1):42-46. |
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| 作者姓名: | 韩 金 邵 勇 |
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| 作者单位: | 西北大学 数学学院,西安 710127 |
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| 基金项目: | 国家自然科学基金(No.11571278);陕西省自然科学基金(No.2015JQ1020) |
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| 摘 要: | 研究两条有限链直积上自同态半环的性质。利用有限链直积上的两种二元运算,给出了两条有限链直积的子集构成自同态像集的充要条件,证明了自同态半环的乘法半群是正则半群。通过对有限链直积上的自同态进行分解,得到了自同态半环可由其乘法半群的幂等元集生成;推广了有限链上自同态半群的一些结果。
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| 关 键 词: | 自同态半环 正则半群 幂等元 |
Endomorphism Semiring of Finite Semilattice |
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| HAN Jin,SHAO Yong.Endomorphism Semiring of Finite Semilattice[J].Computer Engineering and Applications,2019,55(1):42-46. |
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| Authors: | HAN Jin SHAO Yong |
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| Affiliation: | School of Mathematics, Northwest University, Xi’an 710127, China |
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| Abstract: | This paper studies the properties of the endomorphism semiring over the direct product of two finite chains. Using two binary operations on the direct product of two finite chains, a sufficient and necessary condition under which the subset of the direct product of two finite chains is the codomain of the endomorphism is given. Next, it proves that the multiplicative reduct of the endomorphism semiring is a regular semigroup. Finally, by decomposing the endomorphism of the direct product of two finite chains, it obtains that the endomorphism semiring can be generated by the idempotents of its multiplicative reduct. Some known results about the endomorphism semigroup over a finite chain are expanded. |
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| Keywords: | endomorphism semiring regular semigroup idempotent |
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