مشخصات پژوهش

صفحه نخست /CHARACTERIZATION OF LINEAR ...
عنوان CHARACTERIZATION OF LINEAR MAPPINGS ON (BANACH) *-ALGEBRAS BY SIMILAR PROPERTIES TO DERIVATIONS
نوع پژوهش مقاله چاپ‌شده در مجلات علمی
کلیدواژه‌ها ‎*-algebra‎, ‎Banach *-algebra‎, ‎standard operator algebra‎, ‎derivation‎. ‎
چکیده ‎Let A be a *-algebra‎, D :A-->A be a linear map‎, ‎and z in A be fixed‎. ‎We consider the condition that D satisfies xD(y)*+D(x)y*=D(z) ( x*D(y)+D(x)*y=D(z) whenever xy*=z (x*y=z)‎, ‎and under several conditions on A‎, ‎D and z we characterize the structure of D‎. ‎In particular‎, ‎we prove that if A is a Banach *-algebra‎, ‎D is a continuous linear map‎, ‎and z is a left (right) separating point of A‎, ‎then D is a Jordan derivation‎. ‎Our proof is based on complex variable techniques‎. ‎Also‎, ‎we describe a linear map D satisfying the above conditions with z=0 on two classes of *-algebras‎: ‎zero product determined algebras and standard operator algebras‎.
پژوهشگران هوگر قهرمانی (نفر سوم)، کمال فلاحی (نفر دوم)، بهروز فدایی (نفر اول)