In the course of practicing the quality education in Chinese higher education of 21st century, the library, which plays a profound and important role with its special educational condition and means, takes a heavy task of “the second classroom”.
The research type teaching,as a kind of new model with its own teaching approach,idea and procedure different from those of the past,has its special demands for the information service of the library of a Party school.
Hubei police literature guarantee system relies on the China Education and Research Network(CERNET) and police special network, bases on the police literature resource of the Hubei police college library and all levels police department to construct a automatic digital and netty police literature and information guarantee system and provides high level and high efficient literature and information service.
This paper analyses special superiority of university library in aspect of providing telelecture service, and expounds the influence of the development of telelecture on the modernization construction of the library.
This paper analyzes on the main problems faced by the self-education of university students and on the superiorities of university library in the self-education of university students,and points out that the library should develop its own superiorities in both information and human resources and play a special role in guiding and culturing the self-education ability of university students.
Motivated by the physical concept of special geometry, two mathematical constructions are studied which relate real hypersurfaces to tube domains and complex Lagrangian cones, respectively.
The theory is applied to the case of cubic hypersurfaces, which is the one most relevant to special geometry, obtaining the solution of the two classification problems and the description of the corresponding homogeneous special K?hler manifolds.
The first part of this paper describes the construction of pseudo-Riemannian homogeneous spaces with special curvature properties such as Einstein spaces, using corresponding known compact Riemannian ones.
In the special case whenFn is the projective spaceRPn, one also obtains the upper bound.
Except for the Borel and some special cases a corresponding result is not known for the semi-centre of the enveloping algebra ofp.