At the invitation of Professor Francois Collart-Dutilleul from the University of Nantes in France, I attendedan international academic conference fo- cusing on the EU's foreign policies after the Lisbon Treaty, which...At the invitation of Professor Francois Collart-Dutilleul from the University of Nantes in France, I attendedan international academic conference fo- cusing on the EU's foreign policies after the Lisbon Treaty, which was held at the university from Nov. 21 to Dec. 1,2011. Afterwards Professor Collart-Dutilleul asked me to give a lecture on human rights in China to his PhD. students and the following is what I got from this ex- perience in France.展开更多
In this paper, based on Hirota's bilinear method, the Wronskian and Grammian techniques, as well as several properties of the determinant, a broad set of sufficient conditions consisting of systems of linear partial ...In this paper, based on Hirota's bilinear method, the Wronskian and Grammian techniques, as well as several properties of the determinant, a broad set of sufficient conditions consisting of systems of linear partial differential equations are presented. They guarantee that the Wronskian determinant and the Grammian determinant solve the (3 + 1)-dimensional Jimbo-Miwa equation in the bilinear form. Then some special exact Wronskian and Grammian solutions are obtained by solving the differential conditions. At last, with the aid of Maple, some of these special exact solutions are shown graphically.展开更多
In this paper, the concept of generalized Nekrasov matrices is introduced, some properties of these matrices are discussed, obtained equivalent representation of generalized diagonally dominant matrices.
The DNA fragments coding for preS2(120 146) and preS1(21 47) amplified by PCR were fused to both 5′ and 3′ ends of S gene at the position of amino acid 223. The fusion gene was placed downstream of the promoter P7.5...The DNA fragments coding for preS2(120 146) and preS1(21 47) amplified by PCR were fused to both 5′ and 3′ ends of S gene at the position of amino acid 223. The fusion gene was placed downstream of the promoter P7.5 of the universal vaccinia viral vector pGJP 5 and the recombinant vaccinia virus vS2SS1 was then selected by \%in vivo\% homogeneous recombination. Fusion protein S2SS1 could be expressed in the mammalian cells infected with vS2SS1. The investigation of expression, secretion, antigenicity and particle assembly of the S2SS1 protein demonstrated that S2SS1 protein could be assembled into particles which presented preS1, preS2 and S antigenicity and be efficiently secreted from the cells. It also showed that the level of its expression and secretion approached to that of the S protein expressed by the recombinant vaccinia virus.展开更多
This paper presents the analysis of exponential stability of a system consisting of a robot and its associated safety mechanism. The system have various modes of failures and is repairable. The paper investigates the ...This paper presents the analysis of exponential stability of a system consisting of a robot and its associated safety mechanism. The system have various modes of failures and is repairable. The paper investigates the nonnegative stead-state solution of system,the existence of strictly dominant eigenvalue and restriction of essential spectrum growth bound of the system operator. The essential spectral radius of the system operator is also discussed before and after perturbation. The results show that the dynamic solution of the system is exponential stab'flity and converges to the steady-state solution.展开更多
文摘At the invitation of Professor Francois Collart-Dutilleul from the University of Nantes in France, I attendedan international academic conference fo- cusing on the EU's foreign policies after the Lisbon Treaty, which was held at the university from Nov. 21 to Dec. 1,2011. Afterwards Professor Collart-Dutilleul asked me to give a lecture on human rights in China to his PhD. students and the following is what I got from this ex- perience in France.
基金Project supported by the National Natural Science Foundation of China(Grant Nos.11202161 and 11172233)the Basic Research Fund of the Northwestern Polytechnical University,China(Grant No.GBKY1034)
文摘In this paper, based on Hirota's bilinear method, the Wronskian and Grammian techniques, as well as several properties of the determinant, a broad set of sufficient conditions consisting of systems of linear partial differential equations are presented. They guarantee that the Wronskian determinant and the Grammian determinant solve the (3 + 1)-dimensional Jimbo-Miwa equation in the bilinear form. Then some special exact Wronskian and Grammian solutions are obtained by solving the differential conditions. At last, with the aid of Maple, some of these special exact solutions are shown graphically.
文摘In this paper, the concept of generalized Nekrasov matrices is introduced, some properties of these matrices are discussed, obtained equivalent representation of generalized diagonally dominant matrices.
文摘The DNA fragments coding for preS2(120 146) and preS1(21 47) amplified by PCR were fused to both 5′ and 3′ ends of S gene at the position of amino acid 223. The fusion gene was placed downstream of the promoter P7.5 of the universal vaccinia viral vector pGJP 5 and the recombinant vaccinia virus vS2SS1 was then selected by \%in vivo\% homogeneous recombination. Fusion protein S2SS1 could be expressed in the mammalian cells infected with vS2SS1. The investigation of expression, secretion, antigenicity and particle assembly of the S2SS1 protein demonstrated that S2SS1 protein could be assembled into particles which presented preS1, preS2 and S antigenicity and be efficiently secreted from the cells. It also showed that the level of its expression and secretion approached to that of the S protein expressed by the recombinant vaccinia virus.
文摘This paper presents the analysis of exponential stability of a system consisting of a robot and its associated safety mechanism. The system have various modes of failures and is repairable. The paper investigates the nonnegative stead-state solution of system,the existence of strictly dominant eigenvalue and restriction of essential spectrum growth bound of the system operator. The essential spectral radius of the system operator is also discussed before and after perturbation. The results show that the dynamic solution of the system is exponential stab'flity and converges to the steady-state solution.
