Guided by Dengxiaoping theory, the article uses the basic principles ofPublic Administration, Administration Law, Politics, Economics, and Sociology andso on to interpret the related theories of socialism management of spiritualcivilization construction.
The historical evolution of the revolutionary teachers' theory and practice in instillation shows that instillation is the basis for the existence and development of the socialist and communist movement, and of course it also is the basis for the existence and development of ideological and political work.
This essay, as an aspect of theory ofideological and political education, beginning with the process of education of ideological andpolitical education system and focusing on similarities of ideological and political system insocieties with various ideologies, aims at throwing light on what should be included in aperfect ideological and political education system.
The third part considers theabove theories as mainly theoretical basis and deeply studies the ap-plyings in the ideological and political work of these theories, and inthe meantime, advances that, in practice, we must make the Marx-ist Demand Theory a guidance, and do somethings to care for peo-ple , understand people, respect people and guide people in accor-dance with different demands of different people in order to realizethe tit-for-tat quality~actual effect and initiative.
Inheriting Mao Zedong's and Deng Xiaoping's Political and Ideological Work Theory,combining the party's basic principles in the political and ideological work and solution of new situations, problems and conficts in the present society, insisting the scientific application and development of Deng Xiaoping political and Ideological Work Theory, Jiang Zeming creates new experences for the Party's political and ideological work in new practice.
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.