| 1. | Teaching research on cyclic groups in discrete mathematics
离散数学中循环群及其子群的教学研究 |
| 2. | Metahomomorphisms on infinite cyclic groups
无限循环群上的亚同态 |
| 3. | A characterization of non - cyclic groups
非循环群的一个特征性质 |
| 4. | Isomorphic representations of cyclic groups and their direct product
循环群与循环群直积的同构表示 |
| 5. | On the problems of cyclic group
循环群诸类问题探 |
| 6. | On the least bound of the number of non - exponent subgroups of ono - cyclic groups
关于非循环群的非幂子群数的下确界 |
| 7. | Characterization of finite cyclic group and research in the properties of cyclic subgroup
有限循环群的刻划以及子群的性质研究 |
| 8. | Continuous cyclic group
连续循环群 |
| 9. | Theorem 4 . 2 finite c * ( pq ) - group g is soluble . theorem 4 . 4 if g is finitely generated and c * ( n ) - group , then g is polycyclic group
4若有限生成的可解群g是c ” ( )群,则g是多重循环群 |
| 10. | This article proves that a finite cyclic group can be isomorphically represented by direct product of some cyclic groups
摘要本文运用基础代数中有关循环群、直积、同构等理论,证明了一个循环群可以用另一组循环群的直积形式来同构表示。 |
