The Leibniz-Hopf algebra is the free associative algebra with one generator in each positive degree and coproduct given by the Cartan formula. Quasi-symmetric functions are a generalisation of symmetric functions [7],...The Leibniz-Hopf algebra is the free associative algebra with one generator in each positive degree and coproduct given by the Cartan formula. Quasi-symmetric functions are a generalisation of symmetric functions [7],and the algebra of quasi-symmetric functions appear as the dual of the Leibniz-Hopf algebra. The Leibniz-Hopf algebra and its dual are word Hopf algebras and play an important role in combinatorics, algebra and topology. We give some properties of words and consider an another view of proof for the antipode in the dual Leibniz-Hopf algebra.展开更多
Let 0 →I → A →A/I →0 be a short exact sequence of C^*-algebras with A unital. Suppose that I has tracial topological rank no more than one and A/I belongs to a class of certain C^*-algebras. We show that A has t...Let 0 →I → A →A/I →0 be a short exact sequence of C^*-algebras with A unital. Suppose that I has tracial topological rank no more than one and A/I belongs to a class of certain C^*-algebras. We show that A has trazial topological rank no more than one if the extension is quasidiagonal, and A has the property (P1) if the extension is tracially quasidiagonal.展开更多
Let (v, u × c,λ)-splitting BIBD denote a (v, u × c,λ)-splitting balanced incomplete block design of order v with block size u × c and index A. The necessary conditions for the existence of a (v, ...Let (v, u × c,λ)-splitting BIBD denote a (v, u × c,λ)-splitting balanced incomplete block design of order v with block size u × c and index A. The necessary conditions for the existence of a (v, u × c,λ)-splitting BIBD are v ≥ uc, λ(v- 1) -- 0 0 mod (c(u- 1)) and Av(v- 1) - 0 mod (c^2u(u- 1)). In this paper, for 2 ≤λ≤ 9 the necessary conditions for the existence of a (v, 3 × 3, λ)-splitting BIBD are also sufficient with one possible exception for (v, λ) = (39, 9).展开更多
文摘The Leibniz-Hopf algebra is the free associative algebra with one generator in each positive degree and coproduct given by the Cartan formula. Quasi-symmetric functions are a generalisation of symmetric functions [7],and the algebra of quasi-symmetric functions appear as the dual of the Leibniz-Hopf algebra. The Leibniz-Hopf algebra and its dual are word Hopf algebras and play an important role in combinatorics, algebra and topology. We give some properties of words and consider an another view of proof for the antipode in the dual Leibniz-Hopf algebra.
基金supported by National Natural Science Foundation of China (Grant No. 11071188)
文摘Let 0 →I → A →A/I →0 be a short exact sequence of C^*-algebras with A unital. Suppose that I has tracial topological rank no more than one and A/I belongs to a class of certain C^*-algebras. We show that A has trazial topological rank no more than one if the extension is quasidiagonal, and A has the property (P1) if the extension is tracially quasidiagonal.
基金the National Natural Science Foundation of China (No. 10771193)the Starter Foundation for the Doctors of Zhejiang Gongshang University(No. 1020XJ030517)+1 种基金the Natural Science Foundationof Universities of Jiangsu Province (No. 07KJB110090)the Starter Foundation for the Doctors of Nantong University (No. 07B12)
文摘Let (v, u × c,λ)-splitting BIBD denote a (v, u × c,λ)-splitting balanced incomplete block design of order v with block size u × c and index A. The necessary conditions for the existence of a (v, u × c,λ)-splitting BIBD are v ≥ uc, λ(v- 1) -- 0 0 mod (c(u- 1)) and Av(v- 1) - 0 mod (c^2u(u- 1)). In this paper, for 2 ≤λ≤ 9 the necessary conditions for the existence of a (v, 3 × 3, λ)-splitting BIBD are also sufficient with one possible exception for (v, λ) = (39, 9).
