In this paper, we consider ultrapowers of Banach algebras as Banach algebras and the product (J,U) on the second dual of Banach algebras. For a Banach algebra A, we show that if there is a continuous derivation from A into itself, then there is a continuous derivation from (A ∗∗ , (J,U)) into it. Moreover, we show that if there is a continuous derivation from A into X∗∗, where X is a Banach A-bimodule, then there is a continuous derivation from A into ultrapower of X i. e., (X)U. Ultra (character) amenability of Banach algebras is investigated and it will be shown that if every continuous derivation from A into (X)U is inner, then A is ultra amenable. Some results related to left (resp. right) multipliers on (A ∗∗ , (J,U)) are ...
Let A and X be Banach algebras and let X be an algebraic Banach A-module. Then the ℓ-1direct sum A x...
Abstract In this paper, we show that approximate derivations on Banach ∗-algebras are exactly deriva...
Abstract. Let A be an algebra. A sequence {dn} of linear mappings on A is called a higher derivation...
Abstract. Let A be a Banach algebra and σ, τ be continuous homomor-phisms on A. Suppose that X be a ...
Abstract. Let A be a Banach algebra and let every module-valued derivation from A to any Banach A-bi...
Abstract. Let A be a Banach algebra and M be a Banach A-bimodule. We say that a linear mapping δ: A ...
If $D:A \to X$ is a derivation from a Banach algebra to a contractive, Banach $A$-bimodule, then one...
Let A be an algebra. A sequence {dn} of linear mappings on A is called a higher derivation if dn(ab)...
For a Banach algebra ${\cal A}$ and a character $\phi$ on ${\cal A}$, we introduce and study the no...
Let (Formula presented.) be a commutative, unital Banach algebra. We consider the number of differen...
A Banach algebra A is weakly amenable provided that every bounded derivation from A to its dual A ...
AbstractLet K be an ultrametric complete field and let E be an ultrametric space. Let A be the Banac...
In this paper we define a new multiplication on Banach algebra A using commute idempotent endomorphi...
AbstractConditions are given for Banach algebras U and commutative Banach algebras B which insure th...
In this paper we prove that for a commutative character amenable Banach algebra A, if T: A → A is a ...
Let A and X be Banach algebras and let X be an algebraic Banach A-module. Then the ℓ-1direct sum A x...
Abstract In this paper, we show that approximate derivations on Banach ∗-algebras are exactly deriva...
Abstract. Let A be an algebra. A sequence {dn} of linear mappings on A is called a higher derivation...
Abstract. Let A be a Banach algebra and σ, τ be continuous homomor-phisms on A. Suppose that X be a ...
Abstract. Let A be a Banach algebra and let every module-valued derivation from A to any Banach A-bi...
Abstract. Let A be a Banach algebra and M be a Banach A-bimodule. We say that a linear mapping δ: A ...
If $D:A \to X$ is a derivation from a Banach algebra to a contractive, Banach $A$-bimodule, then one...
Let A be an algebra. A sequence {dn} of linear mappings on A is called a higher derivation if dn(ab)...
For a Banach algebra ${\cal A}$ and a character $\phi$ on ${\cal A}$, we introduce and study the no...
Let (Formula presented.) be a commutative, unital Banach algebra. We consider the number of differen...
A Banach algebra A is weakly amenable provided that every bounded derivation from A to its dual A ...
AbstractLet K be an ultrametric complete field and let E be an ultrametric space. Let A be the Banac...
In this paper we define a new multiplication on Banach algebra A using commute idempotent endomorphi...
AbstractConditions are given for Banach algebras U and commutative Banach algebras B which insure th...
In this paper we prove that for a commutative character amenable Banach algebra A, if T: A → A is a ...
Let A and X be Banach algebras and let X be an algebraic Banach A-module. Then the ℓ-1direct sum A x...
Abstract In this paper, we show that approximate derivations on Banach ∗-algebras are exactly deriva...
Abstract. Let A be an algebra. A sequence {dn} of linear mappings on A is called a higher derivation...