On uniformly strongly prime \(\Gamma\)-semirings. (Q874780)

The concepts of uniformly strongly prime ideal of a \(\Gamma\)-semiring and uniformly strongly prime \(\Gamma\)-semiring are introduced and their properties are investigated via operator semirings of \(\Gamma\)-semirings. The authors obtain a one-one correspondence between the set of all usp \(k\)-ideals of a \(\Gamma\)-semiring and the set of all usp \(k\)-ideals of the operator semiring of the \(\Gamma\)-semiring. Also, the authors give the notion of \(t\)-system in a \(\Gamma\)-semiring and obtain that \(P\) is a usp ideal of a \(\Gamma\)-semiring \(S\) if and only if \(P^c\) is a \(t\)-system.