Permuting triderivations and permuting trihomomorphisms in complex Banach algebras

Abstract

In this paper, we solve the following tri-additive s-functional inequalities eqnarray0.1 && \| f(x+y, z-w, a+b) + f(x-y, z+w, a-b) \\ && -2 f(x, z, a) + 2 f(x, w, b) -2f(y, z, b) +2 f(y, w, a)\| \\ && \|s (2f(x+y2, z-w, a+b ) + 2f(x-y2, z+w, a-b) . . \\ && . . -2 f(x, z, a) + 2 f(x, w, b) -2f(y, z, b) +2 f(y, w, a))\| , eqnarray eqnarray0.2 && \|2f(x+y2, z-w, a+b ) + 2f(x-y2, z+w, a-b) . \\ && . -2 f(x, z, a) + 2 f(x, w, b) -2f(y, z, b) +2 f(y, w, a)\| \\ && \|s ( f(x+y, z-w, a+b) + f(x-y, z+w, a-b) \\ && -2 f(x, z, a) + 2 f(x, w, b) -2f(y, z, b) +2 f(y, w, a) )\| , eqnarray where s is a fixed nonzero complex number with |s |< 1. Moreover, we prove the Hyers-Ulam stability and hyperstability of permuting triderivations and permuting trihomomorphisms in Banach algebras and unital C*-algebras, associated with the tri-additive s-functional inequalities (0.1) and (0.2).