Identities involving additive maps on division rings

Abstract

Let g be an additive map on a division ring D. In this paper, we study the functional identity G1(y)g(y)G2(y) = H(y), where G1(Y), G2(Y), H(Y) are generalized polynomials in DG[Y] such that both G1(Y) and G2(Y) are non-zero. By application of this result and its implications, we prove that if D is a non-commutative division ring with char(D) ≠ 2, then the only possible solution of additive maps g1,g2: D → D satisfying the identity g1(y)y-m + yng2(y-1)= 0 is g1 = g2 = 0, where m and n are positive integers with (m,n) ≠ (1,1).

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