Approximate bi-homomorphisms and bi-derivations in normed Lie triple systems (Q2917702)

A normed Lie triple system is a normed space \((A,\|.\|)\) with a trilinear mapping \((x,y,z)\mapsto [xyz]\) satisfying the conditions:NEWLINENEWLINE (i) \([xyz]=-[yxz],\)NEWLINENEWLINE (ii) \([xyz]+[yzx]+[zxy]=0\),NEWLINENEWLINE(iii) \([uv[xyz]]=[[uvx]yz]+[x[uvy]z]+[xy[uvz]]\),NEWLINENEWLINE (iv) \(\|[xyz]\|\leq \|x\|\|y\|\|z\|\), for all \(x,y,z,u,v \in A\).NEWLINENEWLINE In this paper the authors establish the Hyers-Ulam-Rassias stability of bi-homomorphisms and bi-derivations associated with the following quadratic functional equation NEWLINE\[NEWLINEf(x+y,z-w)+f(x-y,z+w)=2f(x,z)+2f(y,w),NEWLINE\]NEWLINE in Lie triple systems.