With the gradual development of socialist market economy into its maturity,and the deepening in constructing harmonious society in China,we should,in building the serving government,employ the new public service theory,establish the humanity spirit,define to main roles and duties of the government in serving,deepen the administrative management system reform,make great efforts to construct the harmony with combined efforts,strengthen the building of civil servants force,improve the civil servants' consciousness of serving the society.
The author holds that the following aspects are to be included in the criteria for major theoretical innovation in the localization process of Marxism in China: 1.background of the theory in terms of problems and practice;
In the base of The unified principle between the order and Jumping about historical materialism, the paper analyses the theory basis, historical basis and realistic basis about China heaping capitalism society and entering Socialism society.
Building international relations theory with Chinese characteristics and times spirit should regard the basic principle of Marxism and spirit of seeking truth from facts as the guidelines,absorb all outstanding culture achievements.
We use the theory of tilting modules for algebraic groups to propose a characteristic free approach to "Howe duality" in the exterior algebra.
This study was continued in the paper [FKRW] in the framework of vertex algebra theory.
As in the case of Mumford's geometric invariant theory (which concerns projective good quotients) the problem can be reduced to the case of an action of a torus.
We also show how to distinguish examples of open subsets with a good quotient coming from Mumford's theory and give examples of open subsets with non-quasi-projective quotients.
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.