Authors: MOHAMMAD SAL MOSLEHIAN, GHADIR SADEGHI
Abstract: Let T, A be operators with domains D(T) \subseteq D(A) in a normed space X. The operator A is called T-bounded if |Ax|\leq a|x|+b|Tx| for some a, b\geq 0 and all x \in D(T). If A has the Hyers--Ulam stability then under some suitable assumptions we show that both T and S: = A+T have the Hyers--Ulam stability. We also discuss the best constant of Hyers--Ulam stability for the operator S. Thus we establish a link between T-bounded operators and Hyers--Ulam stability.
Keywords: Hilbert space; perturbation; Hyers--Ulam stability; closed operator; semi-Fredholm operator.
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