Add to ORKGLet $A$ be a unitary commutative Banach algebra with unit $e$. For $f\in A$ we denote by $\hat f$ the Gelfand transform of $f$ defined on $\hat A$, the set of maximal ideals of $A$. Let $(f_1,\dots,f_n)\in A^n$ be such that $\sum_{i=1}^n\|f_i\|^2 \leq 1$. We study here the existence of solutions $(g_1,\dots,g_n)\in A^n$ to the Bezout equation $f_1g_1+\cdots+f_ng_n=e$, whose norm is controlled by a function of $n$ and $\delta=\inf_{\chi\in\hat A}(|\hat f_1(\chi)|^2+\cdots+|\hat f_n(\chi)|^2)^{1/2}$. We treat this problem for the analytic Beurling algebras and their quotient by closed ideals. The general Banach algebras with compact Gelfand transform are also considered
AbstractLet H' be the algebra of bounded analytic functions in the open unit disk. An ideal I in H' ...
International audienceWe examine Banach algebras of bounded uniformly continuous functions and parti...
To dear Israel Moiseevich Gelfand in connection with his 95th birthday Abstract. In a bounded Lipsch...
Let $A$ be a unitary commutative Banach algebra with unit $e$. For $f\in A$ we denote by $\hat f$ th...
Given data $f=(f_1,f_2,\dots ,f_n)$ in the holomorphic part $ A= F_+$ of a symmetric Banach\slash to...
We prove that certain maximal ideals in Beurling algebras on the unit disc have approximate identiti...
AbstractLet H' be the algebra of bounded analytic functions in the open unit disk. An ideal I in H' ...
In the Gelfand theory of commutative Banach algebras with unit, an element generates a dense ideal i...
International audienceWe study the closed ideal in the Beurling algebras $\aA^{+}_{\alpha,\beta}$ of...
AbstractWe consider the problem of identifying the maximal ideals of a Banach algebra S that is cont...
International audienceWe study the closed ideal in the Beurling algebras $\aA^{+}_{\alpha,\beta}$ of...
We consider the quantization of inversion in commutative p-normed quasi-Banach algebras with unit. T...
Semisimple commutative Banach algebras A admitting exactly one uniform norm (not necessarily complet...
AbstractLet A be a commutative unital Banach algebra with connected maximal ideal space X. We show t...
International audienceWe examine Banach algebras of bounded uniformly continuous functions and parti...
AbstractLet H' be the algebra of bounded analytic functions in the open unit disk. An ideal I in H' ...
International audienceWe examine Banach algebras of bounded uniformly continuous functions and parti...
To dear Israel Moiseevich Gelfand in connection with his 95th birthday Abstract. In a bounded Lipsch...
Let $A$ be a unitary commutative Banach algebra with unit $e$. For $f\in A$ we denote by $\hat f$ th...
Given data $f=(f_1,f_2,\dots ,f_n)$ in the holomorphic part $ A= F_+$ of a symmetric Banach\slash to...
We prove that certain maximal ideals in Beurling algebras on the unit disc have approximate identiti...
AbstractLet H' be the algebra of bounded analytic functions in the open unit disk. An ideal I in H' ...
In the Gelfand theory of commutative Banach algebras with unit, an element generates a dense ideal i...
International audienceWe study the closed ideal in the Beurling algebras $\aA^{+}_{\alpha,\beta}$ of...
AbstractWe consider the problem of identifying the maximal ideals of a Banach algebra S that is cont...
International audienceWe study the closed ideal in the Beurling algebras $\aA^{+}_{\alpha,\beta}$ of...
We consider the quantization of inversion in commutative p-normed quasi-Banach algebras with unit. T...
Semisimple commutative Banach algebras A admitting exactly one uniform norm (not necessarily complet...
AbstractLet A be a commutative unital Banach algebra with connected maximal ideal space X. We show t...
International audienceWe examine Banach algebras of bounded uniformly continuous functions and parti...
AbstractLet H' be the algebra of bounded analytic functions in the open unit disk. An ideal I in H' ...
International audienceWe examine Banach algebras of bounded uniformly continuous functions and parti...
To dear Israel Moiseevich Gelfand in connection with his 95th birthday Abstract. In a bounded Lipsch...
