Let ( A , | | &#x22C5;<!-- ⋅ --> | | ) be a commutative Banach algebra over <

Josie Sparks

Josie Sparks

Answered question

2022-06-02

Let ( A , | | | | ) be a commutative Banach algebra over C. Consider a formal power series f ( z ) := n = 0 a n z n A [ [ z ] ] and let
r := 1 lim sup n | | a n | | 1 / n
For b A denote by ρ ( b ) its spectral radius.
Is it generally true that f ( b ) is divergent (in the | | | |-topology) for any b A with ρ ( b ) > r?

Answer & Explanation

anclarlo5h12v

anclarlo5h12v

Beginner2022-06-03Added 5 answers

No, and more generally you can make no statement along these lines that depends only on ρ ( b ). For instance, let a , b A be elements with nonzero spectral radius such that a b = 0. Let a n = c n a for some scalars c n . Then r can be made arbitrary by choosing c n appropriately, but f ( b ) will always converge since all terms after the first term will be 0.

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