On a Banach algebra of entire functions with a weighted Hadamard multiplication

Abstract

New algebraic-analytic properties of a previously studied Banach algebra A(p) of entire functions are established. For a given fixed sequence (p(n))n≥ 0 of positive real numbers, such that n→ ∞ p(n)1n=∞, the Banach algebra A(p) is the set of all entire functions f such that f(z)=Σn=0∞ f(n) zn (z∈ C), where the sequence (f(n))n≥ 0 of Taylor coefficients of f satisfies f(n)=O(p(n)-1) for n→ ∞, with pointwise addition and scalar multiplication, a weighted Hadamard multiplication with weight given by p (i.e., (f g)(z)=Σn=0∞ p(n) f(n)g(n)zn for all z∈ C), and the norm \|f\|=n≥ 0 p(n)|f(n)|. The following results are shown: The Bass and the topological stable ranks of A(p) are both 1. A(p) is a Hermite ring, but not a projective-free ring. Idempotents and exponentials in A(p) are described, and it is shown that every invertible element of A(p) has a logarithm. A generalised necessary and sufficient `corona-type condition' on the matricial data (A,b) with entries from A(p) is given for the solvability of Ax = b with x also having entries from A(p). The Krull dimension of A(p) is infinite. A(p) is neither Artinian nor Noetherian, but is coherent. The special linear group over A(p) is generated by elementary matrices.