Those are strongly nil radical N S , quasi strongly nil radical N QS ,nil radical N ,quasi nil radical N Q and B nil radical N B (Baer module nil radical).

This paper show: if M is a ring with the prime radiCal P(M), the socle Soc(M),the nil radical N(M) and the Levitzki nil radical L(M),then regarded as a Pring with P=M,Pp(M)=P(M),Socp(M)=Soc(M),Np(M)=N(M) and LP(M)=L(M).

In this paper, the definition of nil radical of zero normal NCD-ring R is given, and the proof is made for that nil radical n(R) is the greatest ideal of R and R / n(R)has no non-zero nil ideals when n(R) is the smallest ideal of R.

Because M/N is not necessarily strongly nil semi-simple, we then defined B-nil radical N_B, such that M/N_B is strongly nil semi-sinple, Finally, the sture theorem of strongly nil semi-simple weaker Γ_N-ring is proved.

The problem of existence of strongly nil radicalin in fed Γ-ring was solved byusing the theory of finit type in the theory of dynamical systems, and the stronger conclusion was obtained by induced the concept of strongly nil ideal of finit type.

In this paper, we defined the weaker Γ_N-ring, and proved that there exits a strongly nil radical N in any weaker Γ_N-ring M.

We show that the supersemiprime radical is e qual to the near nil radical which was defined by XIE Bang_jie in .