English

Algebras of Polynomials Generated by Linear Operators

Functional Analysis 2023-02-06 v1

Abstract

Let EE be a Banach space and AA be a commutative Banach algebra with identity. Let P(E,A){P}(E, A) be the space of AA-valued polynomials on EE generated by bounded linear operators (an nn-homogenous polynomial in P(E,A){P}(E,A) is of the form P=i=1TinP=\sum_{i=1}^\infty T^n_i, where Ti:EAT_i:E\to A (1i<1\leq i <\infty) are bounded linear operators and i=1Tin<\sum_{i=1}^\infty \|T_i\|^n < \infty). For a compact set KK in EE, we let P(K,A){P}(K, A) be the closure in C(K,A)C(K,A) of the restrictions PKP|_K of polynomials PP in P(E,A){P}(E,A). It is proved that P(K,A){P}(K, A) is an AA-valued uniform algebra and that, under certain conditions, it is isometrically isomorphic to the injective tensor product PN(K)^ϵA\mathcal{P}_N(K)\hat\otimes_\epsilon A, where PN(K)\mathcal{P}_N(K) is the uniform algebra on KK generated by nuclear scalar-valued polynomials. The character space of P(K,A){P}(K, A) is then identified with K^N×M(A)\hat{K}_N\times \mathfrak{M}(A), where K^N\hat K_N is the nuclear polynomially convex hull of KK in EE, and M(A)\mathfrak{M}(A) is the character space of AA.

Keywords

Cite

@article{arxiv.2302.01460,
  title  = {Algebras of Polynomials Generated by Linear Operators},
  author = {F. Zaj and M. Abtahi},
  journal= {arXiv preprint arXiv:2302.01460},
  year   = {2023}
}
R2 v1 2026-06-28T08:30:54.172Z