The aim of this study is to carry out genotyping of 61 Y. pestts strmns tsolated trom lwarmota baibacina-Spermophilus undulates Plague Focus of Tianshan Mountains in China. Primer pairs targeting the 22 DFRs were desi...The aim of this study is to carry out genotyping of 61 Y. pestts strmns tsolated trom lwarmota baibacina-Spermophilus undulates Plague Focus of Tianshan Mountains in China. Primer pairs targeting the 22 DFRs were designed for detecting the genotypes of 61 strains. As a result, 61 strains of Y. pestis were divided into four genotypes 1, 2, 3, and 4. Genotypes 1, 2 and 3 were found from west part in Northern Tianshan Mountains Plague Focus, but type 1 was only from Nileke county. The type of strains from Aheqi was different from those of Atushi counties in Southern Tianshan Mountains and similar to strains in Northern Tianshan Mountains Plague Focus. The type 4 distributed over Atushi county, which was identical with that of strains from Marmota caudae Plague Focus of the Pamiri Plateau. It is concluded that geonotyping is identical with ecotyping made by Shuli Ji. Tianshan Mountains Plague Focus and Marmota caudae Plague Focus of the Pamiri Plateau have a cross spreading profile.展开更多
Abstract We introduce the singularity category with respect to Ding projective modules, Db dpsg(R), as the Verdier quotient of Ding derived category Db DP(R) by triangulated subcategory Kb(DP), and give some tri...Abstract We introduce the singularity category with respect to Ding projective modules, Db dpsg(R), as the Verdier quotient of Ding derived category Db DP(R) by triangulated subcategory Kb(DP), and give some triangle equivalences. Assume DP is precovering. We show that Db DP(R) ≌K-,dpb(DP) and Dbpsg(R) ≌ DbDdefect(R). We prove that each R-module is of finite Ding projective dimension if and only if Dbdpsg(R) = 0.展开更多
Let T be a triangulated category and ζ a proper class of triangles. Some basics properties and diagram lemmas are proved directly from the definition of ζ.
It has been proved that the vanishing of Tare homology is a sufficient condition for the derived depth formula to hold in [J. Pure Appl. Algebra, 219, 464-481 (2015)]. In this paper, we inves- tigate when Tate homol...It has been proved that the vanishing of Tare homology is a sufficient condition for the derived depth formula to hold in [J. Pure Appl. Algebra, 219, 464-481 (2015)]. In this paper, we inves- tigate when Tate homology vanishes by studying the stable homology theory for complexes. Properties such as the balancedness and vanishing of stable homology for complexes are studied. Our results show that the vanishing of this homology can detect finiteness of homological dimensions of complexes and regularness of rings.展开更多
文摘The aim of this study is to carry out genotyping of 61 Y. pestts strmns tsolated trom lwarmota baibacina-Spermophilus undulates Plague Focus of Tianshan Mountains in China. Primer pairs targeting the 22 DFRs were designed for detecting the genotypes of 61 strains. As a result, 61 strains of Y. pestis were divided into four genotypes 1, 2, 3, and 4. Genotypes 1, 2 and 3 were found from west part in Northern Tianshan Mountains Plague Focus, but type 1 was only from Nileke county. The type of strains from Aheqi was different from those of Atushi counties in Southern Tianshan Mountains and similar to strains in Northern Tianshan Mountains Plague Focus. The type 4 distributed over Atushi county, which was identical with that of strains from Marmota caudae Plague Focus of the Pamiri Plateau. It is concluded that geonotyping is identical with ecotyping made by Shuli Ji. Tianshan Mountains Plague Focus and Marmota caudae Plague Focus of the Pamiri Plateau have a cross spreading profile.
基金Supported by National Natural Science Foundation of China(Grant Nos.11261050,11361051 and 11361052)Program for New Century Excellent Talents in University(Grant No.NCET-13-0957)
文摘Abstract We introduce the singularity category with respect to Ding projective modules, Db dpsg(R), as the Verdier quotient of Ding derived category Db DP(R) by triangulated subcategory Kb(DP), and give some triangle equivalences. Assume DP is precovering. We show that Db DP(R) ≌K-,dpb(DP) and Dbpsg(R) ≌ DbDdefect(R). We prove that each R-module is of finite Ding projective dimension if and only if Dbdpsg(R) = 0.
基金Supported by National Natural Science Foundation of China(Grant No.11001222)
文摘Let T be a triangulated category and ζ a proper class of triangles. Some basics properties and diagram lemmas are proved directly from the definition of ζ.
基金Supported by National Natural Science Foundation of China(Grant Nos.11261050,11361051 and 11501451)Program for New Century Excellent Talents in University(Grant No.NCET-13-0957)
文摘It has been proved that the vanishing of Tare homology is a sufficient condition for the derived depth formula to hold in [J. Pure Appl. Algebra, 219, 464-481 (2015)]. In this paper, we inves- tigate when Tate homology vanishes by studying the stable homology theory for complexes. Properties such as the balancedness and vanishing of stable homology for complexes are studied. Our results show that the vanishing of this homology can detect finiteness of homological dimensions of complexes and regularness of rings.
