The structure of k-potents and mixed Jordan-power preservers on matrix algebras
Abstract
Let Mn(F) denote the algebra of n × n matrices over an algebraically closed field F of characteristic different from 2. For n 2, we classify all maps φ : Mn(F) Mn(F) satisfying the mixed Jordan-power identity φ(Ak B) = φ(A)k φ(B), for all A,B ∈ Mn(F), where denotes the (normalized) Jordan product A B := 12(AB + BA) and k ∈ N. We show that every such map is either constant, taking a fixed (k+1)-potent value, or there exist an invertible matrix T ∈ Mn(F), a ring monomorphism ω : F F, and a k-th root of unity ∈ F such that φ takes one of the forms φ(X) = \, T\, ω(X)\, T-1 or φ(X) = \, T\, ω(X)t\, T-1, where ω(X) denotes the matrix obtained by applying ω entrywise to X, and (·)t denotes matrix transposition. In particular, every nonconstant solution is necessarily additive. The classification relies fundamentally on the preservation of (k+1)-potents and their intrinsic structural properties.
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