http://chineseinput.net/에서 pinyin(병음)방식으로 중국어를 변환할 수 있습니다.
변환된 중국어를 복사하여 사용하시면 됩니다.
Relation Between Bp(3) and Cp(3) With Their Order Components Where p Is an Odd Prime
Huaguo Shi,Guiyun Chen 한국전산응용수학회 2009 Journal of applied mathematics & informatics Vol.27 No.3
It is proved that if M = Bp(3) orCp(3), p is an odd prime, G is a finite group and has the same order components of M, then G <기호>Bp(3) or Cp(3). It is proved that if M = Bp(3) orCp(3), p is an odd prime, G is a finite group and has the same order components of M, then G <기호>Bp(3) or Cp(3).
RELATION BETWEEN $B_p(3)$ AND $C_p(3)$ WITH THEIR ORDER COMPONENTS WHERE p IS AN ODD PRIME
Shi, Huaguo,Chen, Guiyun The Korean Society for Computational and Applied M 2009 Journal of applied mathematics & informatics Vol.27 No.3
It is proved that if $M\;=\;B_p(3)$ or $C_p(3)$, p is an odd prime, G is a finite group and has the same order components of M, then $G\;{\cong}\;Bp(3)$ or $C_p(3)$.
FINITE GROUPS WHICH ARE MINIMAL WITH RESPECT TO S-QUASINORMALITY AND SELF-NORMALITY
Han, Zhangjia,Shi, Huaguo,Zhou, Wei Korean Mathematical Society 2013 대한수학회보 Vol.50 No.6
An $\mathcal{SQNS}$-group G is a group in which every proper subgroup of G is either s-quasinormal or self-normalizing and a minimal non-$\mathcal{SQNS}$-group is a group which is not an $\mathcal{SQNS}$-group but all of whose proper subgroups are $\mathcal{SQNS}$-groups. In this note all the finite minimal non-$\mathcal{SQNS}$-groups are determined.
Zhangjia Han,Huaguo Shi,Guiyun Chen 대한수학회 2014 대한수학회보 Vol.51 No.4
A finite group G is called a QNS-group if every minimal subgroup X of G is either quasinormal in G or self-normalizing. In this paper the authors classify the non-QNS-groups whose proper subgroups are all QNS-groups.
Han, Zhangjia,Shi, Huaguo,Chen, Guiyun Korean Mathematical Society 2014 대한수학회보 Vol.51 No.4
A finite group G is called a $\mathcal{QNS}$-group if every minimal subgroup X of G is either quasinormal in G or self-normalizing. In this paper the authors classify the non-$\mathcal{QNS}$-groups whose proper subgroups are all $\mathcal{QNS}$-groups.
2Dn(3)(9 n=2m +1 not a prime) CAN BE CHARACTERIZED BY ITS ORDER COMPONENTS
Guiyun Chen,Huaguo Shi 한국전산응용수학회 2005 Journal of applied mathematics & informatics Vol.19 No.1-2
In this paper we prove that if G is a finite group, 2Dn(3)(9 ≤ n =2m +1 not a prime), G and M have the same order components, then
Dan Chen,Shi-yang Pan,Erfu Xie,Li Gao,Huaguo Xu,Wenying Xia,Ting Xu,Peijun Huang 대한진단검사의학회 2017 Annals of Laboratory Medicine Vol.37 No.1
Background: Circulating levels of cell-free DNA increase in many pathologic conditions. However, notable discrepancies in the quantitative analysis of cell-free DNA from a large number of laboratories have become a considerable pitfall, hampering its clinical application. Methods: We designed a novel recombinant DNA fragment that could be applied as an internal standard in a newly developed and validated duplex real-time PCR assay for the quantitative analysis of total cell-free plasma DNA, which was tested in 5,442 healthy adults and 200 trauma patients. Results: Compared with two traditional methods, this novel assay showed a lower detection limit of 0.1 ng/mL, lower intra- and inter-assay CVs, and higher accuracy in the recovery test. The median plasma DNA concentration of healthy males (20.3 ng/mL, n=3,092) was significantly higher than that of healthy females (16.1 ng/mL, n=2,350) (Mann-Whitney two-sample rank sum test, P<0.0001). The reference intervals of plasma DNA concentration were 0-45.8 ng/mL and 0-52.5 ng/mL for healthy females and males, respectively. The plasma DNA concentrations of the majority of trauma patients (96%) were higher than the upper normal cutoff values and were closely related to the corresponding injury severity scores (R2=0.916, P<0.0001). Conclusions: This duplex real-time PCR assay with a new internal standard could eliminate variation and allow for more sensitive, repeatable, accurate, and stable quantitative measurements of plasma DNA, showing promising application in clinical diagnosis.
[ $^2D_{n}(3)(9{\le}n = 2^m + 1\;not a prime)$ ] CAN BE CHARACTERIZED BYITS ORDER COMPONENTS
CHEN, GUIYUN,SHI, HUAGUO 한국전산응용수학회 2005 Journal of applied mathematics & informatics Vol.19 No.1
In this paper we prove that if G is a finite group, $^2D_{n}(3)(9{\le}n = 2^m + 1\;not a prime)$, G and M have the same order components, then G$\cong$M.
Zhangjia Han,Guiyun Chen,Huaguo Shi 대한수학회 2013 대한수학회지 Vol.50 No.3
A finite group G is called an NSN-group if every proper sub-group of G is either normal in G or self-normalizing. In this paper, thenon-NSN-groups whose proper subgroups are all NSN-groups are deter-mined.
Han, Zhangjia,Chen, Guiyun,Shi, Huaguo Korean Mathematical Society 2013 대한수학회지 Vol.50 No.3
A finite group G is called an NSN-group if every proper subgroup of G is either normal in G or self-normalizing. In this paper, the non-NSN-groups whose proper subgroups are all NSN-groups are determined.