Lie bracket derivation-derivations in Banach algebras
Abstract
In this paper, we introduce and solve the following additive-additive (s,t)-functional inequality eqnarray0.1 && \|g(x+y) -g(x) -g(y)\| +\| h(x+y) + h(x-y) -2 h(x) \| && \|s( 2 g(x+y2)-g(x)-g(y))\|+ \|t ( 2h(x+y2)+ 2h (x-y2)- 2h (x)) \| , eqnarray where s and t are fixed nonzero complex numbers with |s| <1 and |t| <1. Using the direct method and the fixed point method, we prove the Hyers-Ulam stability of Lie bracket derivation-derivations in complex Banach algebras, associated to the additive-additive (s,t)-functional inequality (0.1) and the following functional inequality eqnarray 0.2\| [g, h](xy)-[g,h](x) y- x [g,h](y) \| +\| h(xy) - h(x) y -x h(y) \| (x,y). eqnarray
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