Quasicompact endomorphisms of commutative semiprime Banach algebras

Joel F. Feinstein; Herbert Kamowitz

Displaying similar documents to “Quasicompact endomorphisms of commutative semiprime Banach algebras”

On the uniqueness of uniform norms and C*-norms

P. A. Dabhi, H. V. Dedania (2009)

Studia Mathematica

Similarity:

We prove that a semisimple, commutative Banach algebra has either exactly one uniform norm or infinitely many uniform norms; this answers a question asked by S. J. Bhatt and H. V. Dedania [Studia Math. 160 (2004)]. A similar result is proved for C*-norms on *-semisimple, commutative Banach *-algebras. These properties are preserved if the identity is adjoined. We also show that a commutative Beurling *-algebra L¹(G,ω) has exactly one uniform norm if and only if it has exactly one C*-norm;...

A domination theorem for function algebras

W. Żelazko (1981)

Colloquium Mathematicae

Similarity:

Concerning non-commutative Banach algebras of type ES

W. Żelazko (1969)

Colloquium Mathematicae

Similarity:

Pure States and P-Commutative Banach *-Algebras.

R.S. Doran, Wayne Tiller (1988)

Manuscripta mathematica

Similarity:

Banach power - associative algebras : the complex and (or) non commutative cases

Bruno Iochum, Guy Loupias (1991)

Annales scientifiques de l'Université de Clermont. Mathématiques

Similarity:

Positive multiplication preserves dissipativity in commutative $C^{*}$ -algebras.

Sommariva, Alvise, Vianello, Marco (2001)

Journal of Inequalities and Applications [electronic only]

Similarity:

Banach algebras which are a direct sum of division algebras

Antonio Fernández López, Eulalia García Rus (1986)

Extracta Mathematicae

Similarity:

A simple example of a non-commutative Arens product.

Ignacio Zalduendo (1991)

Publicacions Matemàtiques

Similarity:

A simple and natural example is given of a non-commuting Arens multiplication.

Universal properties of some commutative radical Banach algebras.

Jean Esterle (1981)

Journal für die reine und angewandte Mathematik

Similarity:

A commutativity theorem for Banach algebras

Donald Z. Spicer (1973)

Colloquium Mathematicae

Similarity:

Additively spectral-radius preserving surjections between unital semisimple commutative Banach algebras

Osamu Hatori, Go Hirasawa, Takeshi Miura (2010)

Open Mathematics

Similarity:

Let A and B be unital, semisimple commutative Banach algebras with the maximal ideal spaces M A and M B, respectively, and let r(a) be the spectral radius of a. We show that if T: A → B is a surjective mapping, not assumed to be linear, satisfying r(T(a) + T(b)) = r(a + b) for all a; b ∈ A, then there exist a homeomorphism φ: M B → M A and a closed and open subset K of M B such that $\hat{T (a)} (y) = \{\begin{matrix} \hat{T (e)} (y) \hat{a} (φ (y)) y \in K \\ \hat{T (e)} (y) \bar{\hat{a} (φ (y))} y \in M_{ℬ} ∖ K \end{matrix}$ for all a ∈ A, where e is unit element of A. If, in addition, $\hat{T (e)} = 1$ and $\hat{T (i e)} = i$ on M B, then T is an algebra isomorphism. ...

Power factorization in Banach modules over commutative radical Banach algebras.

Niels Gronbaek (1982)

Mathematica Scandinavica

Similarity:

Normed "upper interval" algebras without nontrivial closed subalgebras

C. J. Read (2005)

Studia Mathematica

Similarity:

It is a long standing open problem whether there is any infinite-dimensional commutative Banach algebra without nontrivial closed ideals. This is in some sense the Banach algebraists' counterpart to the invariant subspace problem for Banach spaces. We do not here solve this famous problem, but solve a related problem, that of finding (necessarily commutative) infinite-dimensional normed algebras which do not even have nontrivial closed subalgebras. Our examples are incomplete normed...

Local Banach algebras as Henselian rings

H. Dales (1987)

Studia Mathematica

Similarity: