Lie Ideals and Homoderivations in Semiprime Rings

Let S be a 2-torsion free semiprime ring and U be a noncentral square-closed Lie ideal of S . An additive mapping ℏ on S is defined as a homoderivation if ℏ ( a b ) = ℏ ( a ) ℏ ( b ) + ℏ ( a ) b + a ℏ ( a ) for all a , b ∈ S . In the present paper, we shall prove that ℏ is a commuting map on U if any one of the following holds: (i) ℏ ( a ˜ 1 a ˜ 2 ) + a ˜ 1 a ˜ 2 ∈ Z , (ii) ℏ ( a ˜ 1 a ˜ 2 ) − a ˜ 1 a ˜ 2 ∈ Z , (iii) ℏ a ˜ 1 ∘ a ˜ 2 = 0 , (iv) ℏ a ˜ 1 ∘ a ˜ 2 = a ˜ 1 , a ˜ 2 , (v) ℏ a ˜ 1 , a ˜ 2 = 0 , (vi) ℏ a ˜ 1 , a ˜ 2 = ( a ˜ 1 ∘ a ˜ 2 ) , (vii) a ˜ 1 ℏ ( a ˜ 2 ) ± a ˜ 1 a ˜ 2 ∈ Z , (viii) a ˜ 1 ℏ ( a ˜ 2 ) ± a ˜ 2 a ˜ 1 = 0 , (ix) a ˜ 1 ℏ ( a ˜ 2 ) ± a ˜ 1 ∘ a ˜ 2 = 0 , (x) [ ℏ ( a ˜ 1 ) , a ˜ 2 ] ± a ˜ 1 a ˜ 2 = 0 , (xi) [ ℏ ( a ˜ 1 ) , a ˜ 2 ] ± a ˜ 2 a ˜ 1 = 0 , for all a ˜ 1 , a ˜ 2 ∈ U , where ℏ is a homoderivation on S .