On Homomorphisms between C*-Algebras and Linear Derivations on C*-Algebras

“…By the same reasoning as in the proof of Theorem 11 in [24], the mapping D : A → A is a derivation satisfying (5.4). [16,24] Let p and θ be positive real numbers with p < 1, and let f : A → A be a mapping satisfying (5.1) and (5.3) such that…”

“…Thus the multiplicative bijective mapping f : A → B is a C * -algebra isomorphism. [17,20,24] Let p and θ be positive real numbers with p < 1 3 , and let f : A → B be a multiplicative bijective mapping satisfying (2.8) and (2.11) such that…”

Approximate Isomorphisms in C *-Algebras

“…By the same reasoning as in the proof of Theorem 11 in [24], the mapping D : A → A is a derivation satisfying (5.4). [16,24] Let p and θ be positive real numbers with p < 1, and let f : A → A be a mapping satisfying (5.1) and (5.3) such that…”

“…Thus the multiplicative bijective mapping f : A → B is a C * -algebra isomorphism. [17,20,24] Let p and θ be positive real numbers with p < 1 3 , and let f : A → B be a multiplicative bijective mapping satisfying (2.8) and (2.11) such that…”

Approximate Isomorphisms in C *-Algebras

“…This type of stability involving a product of powers of norms is called Ulam-Gavruta-Rassias Stability by Bouikhalene and Elquorachi [3], Nakmahachalasint [17,18], Park and Najati [19], Pietrzyk [20] and Sibaha et al [30].…”

Ulam stability of a generalized reciprocal type functional equation in non-Archimedean fields

“…Czerwik [11] proved the Hyers-Ulam stability of the quadratic functional equation. The stability problems of several functional equations have been extensively investigated by a number of authors and there are many interesting results concerning this problem (see [15,20,23], [35]- [37], [41]- [50]). …”

Fixed Points and Fuzzy Stability of Functional Equations Related to Inner Product