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Abstract
Let G be a flat finite-type group scheme over a scheme S, and X a noetherian S-scheme on which G acts. We define and study G-prime and G-primary G-ideals on X and study their basic properties. In particular, we prove the existence of minimal G-primary decomposition and the well-definedness of G-associated G-prime G-ideals. We also prove a generalization of Matijevic–Roberts type theorem. In particular, we prove Matijevic–Roberts type theorem on graded rings for F-regular and F-rational properties.
2000 Mathematics Subject Classification:
Notes
Communicated by S. Goto.