be born at the right moment
- be born at the right moment的基本解释
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应运而生
- 相似词
- 更多 网络例句 与be born at the right moment相关的网络例句 [注:此内容来源于网络,仅供参考]
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It's thought that the shareholder's right consists self-profit right andcommon-profit right in company theory now,but in fact,shareholder's many rightscannot be reduced to self-profit right or common-profit right.After analysis inthis article,the shareholder's rights which are not self-profit right norcommon-profit right can be disparted into two categories,and the author named themexpectancy right and coexistence right.In this way,shareholder's right consistsnot only self-profit right and common-profit right but two new sorts ofshareholder's right,which are expectancy right and coexistence right.
现在的公司法理论均将股东权分为自益权与共益权,但事实上,股东的很多权利不能用自益权和共益权进行概括;本章经过认为分析,将不能用自益权与共益权概括的股东权分为两类,并分别将其命名为期待权和共处权,这样,股东权除了包括自益权和共益权外,又有了两种新的股东权,即期待权和共处权。
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So This thesis maintain right mortgage right to allow thing right for hypothec that target establish or with movable property thing right of all right, its target is concrete should include farmland right to use , base right to use , natural resources right to use and allusion quatation right; in a situation that cant justify oneself in right system of the right quality , set up a system of guaranteeing central right with hypothec system of the right; house property and real estate can be differentiated the mortgage.
因此,本文主张权利抵押权是以所有权以外的不动产物权或准物权为标的而成立的抵押权,其标的具体应包括农地使用权、基地使用权、自然资源使用权和典权;在权利质权制度无法自圆其说的情况下,建立一个以权利抵押权制度为核心的权利担保制度;房产和地产可以分别抵押。
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Finally, it investigate QF-ring with right gpm-injective, and obtain the following theorem:Theorem The following statements are equivalent:(1) R is quasi-Frobeniusean ring:(2) R is right noetherian, left pm-injective ring, right pm-injective ring;(3) R is right noetherian, left pm-injective ring, right GP-injective ring;(4) R is right noetherian, left gpm-injective ring, right gpm-injective ring;(5) R is right noetherian, right gpm-injective ring and each right minimal ideal is right annihilator.
最后用右gpm-内射对QF环进行研究,得到了如下定理:定理下列条件等价:(1) R是quasi-Frobeniusean环;(2) R是右Noether,左pm-内射环,右pm-内射环:(3) R是右Noether,左pm-内射环,右GP-内射环;(4) R是右Noether,左gpm-内射环,右gpm-内射环;(5) R是右Noether,右gpm-内射环且每个极小右理想是右零化子。